zotero-db/storage/TMC268GX/.zotero-ft-cache

11222 lines
218 KiB
Plaintext
Raw Normal View History

GIFT OF MICHAEL REESE
ELECTEICAL PAPERS.
VOL. II.
ELECTRICAL PAPERS
BY
OLIVER HEAVISIDE
IN TWO VOLUMES
VOL. II.
ifieto gorfe
MACMILLAN AND CO.
AND LONDON
1894
[All rights reserved]
~06
CONTENTS OF VOL. II.
A
ART. 31. ON THE ELECTEOMAGNETIC WAVE-SUEFACE.
l
Scalars and Vectors.
4
Scalar Product. -
4
Vector Product.
5
Hamilton's V.
5
Linear Vector Operators.
6
Inverse Operators.
6
Conjugate Property.
6
Theorem. -
7
... Transformation-Formula.
The Equations of Induction.
7 8
Plane Wave.
3
Index- Surface.
The Wave-Surface.
.....
9 11
Some Cartesian Expansions.
16
Directions of B, H, D, and B.
19
Note on Linear Operators and Hamilton's Cubic. -
19
Note on Modification of Index-Equation when c and n are
Eotational.
22
ART. 32. NOTES ON NOMENCLATUEE.
NOTE 1. Ideas, Words, and Symbols.
23
NOTE 2. On the Eise and Progress of Nomenclature.
25
ABT. 33. NOTES ON THE SELF-INDUCTION OF WIEES.
28
ART. 34. ON THE USE OF THE BEIDGE AS AN INDUCTION
BALANCE.
33
ART. 35. ELECTEOMAGNETIC INDUCTION AND ITS PEOPAGA-
TION. (SECOND HALF.)
SECTION 25. Some Notes on Magnetization.
39
SECTION 26. The Transient State in a Eound Wire with a close-
fitting Tube for the Eeturn Current. -
44
vi
ELECTRICAL PAPERS.
SECTION 27. The Variable Period in a Round Wire with a Concentric Tube at any Distance for the Return Current. -
SECTION 28. Some Special Results relating to the Rise of the
Current in a Wire.
SECTION 29. SECTION 30.
Oscillatory Impressed Force at one End of a Line.
Its Effect. Application to Long-Distance Telephony and Telegraphy.
Impedance Formulas for Short Lines. Resistance of Tubes. -
SECTION 31. The Influence of Electric Capacity.
Formulae.
Impedance
SECTION 32. The Equations of Propagation along Wires. Ele-
mentary.
SECTION 33. The Equations of Propagation.
Self-induction. -
-
Introduction of
SECTION 34. Extension of the Preceding to Include the Propagation of Current into a Wire from its Boundary. -
SECTION 35. The Transfer of Energy and its Application to Wires. Energy- Current.
SECTION 36.
Resistance and Self-induction of a Round Wire with
Current Longitudinal. Ditto, with Induction Longitudinal. Their Observation and Measurement.
SECTION 37. SECTION 38.
General Theory of the Christie Balance. Differential Equation of a Branch. Balancing by means of Reduced Copies.
Theory of the Christie as a Balance of Self and
-..- Mutual Electromagnetic Induction. Felici's In-
duction Balance.
SECTION 39a. Felici's Balance Disturbed, and the Disturbance
Equilibrated.
SECTION 39&.
Theory of the Balance of Thick Wires, both in the Christie and Felici Arrangements. Transformer with Conducting Core.
SECTION 40. Preliminary to Investigations concerning Long-
Distance Telephony and Connected Matters. -
-
SECTION 41. Nomenclature Scheme. Simple Properties of the Ideally Perfect Telegraph Circuit. -
SECTION 42.
Speed of the Current. Effect of Resistance at the
Sending End of the Line. Oscillatory Establishment of the Steady State when both Ends are
short-circuited.
PAGE 50 55
61 67 71 76 81 86 91
97 102 106 112
115 119 124
128
CONTENTS.
VII
SECTION 43.
Reflection due to any Terminal Resistance, and Establishment of the Steady State. Insulation. Reservational Remarks. Effect of varying the
Inductance. Maximum Current. -
SECTION 44.
Any Number of Distortionless Circuits radiating from a Centre, operated upon simultaneously. Effect of Intermediate Resistance: Transmitted and Reflected Waves. Effect of a Continuous Distribution of
Resistance. Perfectly Insulated Circuit of no Resistance. Genesis and Development of a Tail due to Resistance. Equation of a Tail in a Perfectly Insulated Circuit.
SECTION 45.
Effect of a Single Conducting Bridge on an Isolated Wave. Conservation of Current at the Bridge.
Maximum Loss of Energy in Bridge-Coil, with Maximum Magnetic Force. Effect of any Number
of Bridges, and of Uniformly Distributed Leakage. The Negative Tail. The Property of the Persistence of Momentum.
SECTION 46.
Cancelling of Reflection by combined Resistance and Bridge. General Remarks. True Nature of the
Problem of Long-Distance Telephony. How not
to do it. Non-necessity of Leakage to remoye Distortion under Good Circumstances, and the Reason. Tails in a Distortional Circuit. Complete
Solutions.
SECTION 47.
Two Distortionless Circuits of Different Types in Sequence. Persistence of Electrification, Momen-
tum, and Energy. Abolition of Reflection by Equality of Impedances. Division of a Disturbance between several Circuits. Circuit in which the
Speed of the Current and the Rate of Attenuation are Variable, without any Tailing or Distortion in
Reception.
PAGE 132 137 141 146 151
ART. 36. SOME NOTES ON THE THEORY OF THE TELEPHONE,
AND ON HYSTERESIS.
155
ART. 37. ELECTROSTATIC CAPACITY OF OVERGROUND WIRES. 159
ART. 38. MR. W. H. PREECE ON THE SELF-INDUCTION OF WIRES. 160
ART. 39. NOTES ON NOMENCLATURE.
NOTE 4. Magnetic Resistance, etc. -
-
-
-
165
NOTE 5. Magnetic Reluctance.
168
vfii
ELECTRICAL PAPERS.
ART. 40. ON THE SELF-INDUCTION OF WIRES.
PART 1.
Remarks on the Propagation of Electromagnetic Waves
along Wires outside them, and the Penetration of
Current into Wires. Tendency to Surface Concen-
tration. Professor Hughes' s Experiments.
-
-
New (Duplex) Method of Treating the Electromagnetic Equations. The Flux of Energy.
Application of the General Equations to a Round Wire with Coaxial Return-Tube. The Differential Equations and Normal Solutions. Arbitrary Initial State.
Simplifications. Thin Return Tube of Constant Resis-
tance. Also Return of no Resistance. -
-
-
Ignored Dielectric Displacement. Magnetic Theory of Establishment of Current in a Wire. Viscous Fluid
Analogy.
Magnetic Theory of S.H. Variations of Impressed Voltage and resulting Current.
PAGE
168 172 175 178 181 183
PART 2. Extension of General Theory to two Coaxial Conducting
Tubes.
185
Electrical Interpretation of the Differential Equations.
V Practical Simplification in terms of Voltage and
Current C.
-
186
Previous Ways of treating the subject of Propagation
along Wires.
-
190
The Effective Resistance and Inductance of Tubes.
-
192
Train of Waves due to S.H. Impressed Voltage. Practi-
cal Solution.
194
Effects of Quasi -Resonance. Fluctuations in the Im-
pedance. -
-
-
195
Derivation of Details from the Solution for the Total
Current.
197
Note on the Investigation of Simple-Harmonic States. -
198
PART 3. Remarks on the Expansion of Arbitrary Functions in
Series.
201
The
Conjugate
Property
U-^-
T 1Z
in
a
Dynamical
System
with Linear Connections.
202
Application to the General Electromagnetic Equations. -
203
Application to any Electromagnetic Arrangements sub-
ject to V = ZC.
204
CONTENTS.
ix
Determination of Size of Normal Systems of V and G to
express Initial State. Complete Solutions obtainable
L with any Terminal Arrangements provided 7?, S,
are Constants.
Complete Solutions obtainable when R, S, L are Func-
tions of z, though not of p. Effect of Energy in Terminal Arrangements.
Case of Coaxial Tubes when the Current is Longitudinal. Also when the Electric Displacement is Negligible. -
Coaxial Tubes with Displacement allowed for. Failure
to obtain Solutions in Terms of Fand (7, except when Terminal Conditions are F<7 = 0, or when there are
no Terminals, on account of the Longitudinal EnergyFlux in the Conductors.
Verification by Direct Integrations.
State.
A Special Initial
-
The Effect of Longitudinal Impressed Electric Force in
the Circuit. The Condenser Method.
-
-
Special Cases of Impressed Force.
How to make a Practical Working System of V and G
Connections.
PART 4. Practical Working System in terms of V and G admitting of Terminal Conditions of the Form V- ZG.
Extension to a Pair of Parallel Wires, or to a Single Wire.
Effect of Perfect Conductivity of Parallel Straight Con-
ductors. Lines of Electric and Magnetic Force
strictly Orthogonal, irrespective of Form of Section
of Conductors. Constant Speed of Propagation.
-
Extension of the Practical System to Heterogeneous
Circuits, with "Constants" varying from place to
place. Examination of Energy Properties.
-
V The Solution for and G due to an Arbitrary Distribu-
tion of e, subject to any Terminal Conditions. -
-
Explicit Example of a Circuit of Varying Resistance, etc.
Bessel Functions.
Homogeneous Circuit. Fourier Functions. Expansion
of Initial State to suit the Terminal Conditions.
-
Transition from the Case of Eesistance, Inertia, and
Elastic Yielding to the same without Inertia. -
-
Transition from the Case of Eesistance, Inertia, and Elastic Yielding to the same without Elastic Yielding.
PAGE
206
207 208
210 212 215 217 218 219 220
221
222 225 229 231 234 235
ELECTRICAL PAPERS.
On Telephony by Magnetic Influence between Distant
Circuits. -
-
PART 5.
St. Venant's Solutions relating to the Torsion of Prisms
applied to the Problem of Magnetic Induction in
Metal Rods, with the Electric Current longitudinal,
and with close-fitting Return-Current. -
-
-
Subsidence of initially Uniform Current in a Rod of
Rectangular Section, with close-fitting Return-Current.
Effect of a Periodic Impressed Force acting at one end of a Telegraph Circuit with any Terminal Conditions. The General Solution.
Derivation of the General Formula for the Amplitude of Current at the End remote from the Impressed Force.
The Effective Resistance and Inductance of the Terminal Arrangements.
Special Details concerning the above. Quickening Effect of Leakage. The Long-Cable Solution, with Magnetic Induction ignored.
Some Properties of the Terminal Functions. -
PART 6.
General Remarks on the Christie considered as an Induction Balance. Full- Sized and Reduced Copies. -
Conjugacy of Two Conductors in a Connected System.
The Characteristic Function and its Properties.
-
Theory of the Christie Balance of Self-induction. -
Remarks on the Practical Use of Induction Balances,
and the Calibration of an Induetometer. -
-
-
Some Peculiarities of Self-induction Balances. Inad-
equacy of S.H. Variations to represent Intermittences.
Disturbances produced by Metal, Magnetic and Non-
magnetic. The Diffusion - Effect. Equivalence of
Nonconducting Iron to Self-induction. -
-
-
Inductance of a Solenoid. The Effective Resistance and
Inductance pf Round Wires at a given Frequency, with the Current Longitudinal ; and the Corresponding Formulae when the Induction is Longitudinal. -
The Christie Balance of Resistance, Permittance, and
Inductance.
General Theory of the Christie Balance with Self and Mutual Induction all over.
Examination of Special Cases. Reduction of the Three Conditions of Balance to Two.
PAGE 237
240 243
245 248 250
252 254 256 258 262 265 269
273
277 280 281 284
CONTENTS.
xi
... Miscellaneous Arrangements. Effects of Mutual Induc-
tion between the Branches.
.
PAGE 286
PART 7. Some Notes on Part VI. (1). Condenser and Coil Balance.
289
(2). Similar Systems.
290
(3). The Christie Balance of Kesistance, Self and Mutual
Induction.
291
(4). Reduction of Coils in Parallel to a Single Coil.
-
292
(5). Impressed Voltage in the Quadrilateral. General
Property of a Linear Network. -
-
-
294
Note on Part III. Example of Treatment of Terminal
Conditions. Induction-Coil and Condenser. -
-
297
Some Notes on Part IV. Looped Metallic Circuits.
... Interferences due to Inequalities, and consequent
Limitations of Application.
-
302
PART 8. The Transmission of Electromagnetic Waves along Wires
without Distortion. -
-
307
Properties of the Distortionless Circuit itself, and Effect
of Terminal Reflection and Absorption. -
-
-
Effect of Resistance and Conducting Bridges Inter-
mediately Inserted. -
-
Approximate Method of following the Growth of Tails,
and the Transmission of Distorted Waves.
-
-
311 315 318
Conditions Regulating the Improvement of Transmission.
322
ART. 41. ON TELEGRAPH AND TELEPHONE CIRCUITS.
APP. A. On the Measure of the Permittance and Retardation of
Closed Metallic Circuits. -
-
323
APP. B. On Telephone Lines (Metallic Circuits) considered as
Induction-Balances. -
334
APP. C. On the Propagation of Signals along Wires of Low
Resistance, especially in reference to Long-Distance
Telephony.
339
ART. 42.
ON RESISTANCE AND CONDUCTANCE OPERATORS, AND THEIR DERIVATIVES, INDUCTANCE AND PERMITTANCE, ESPECIALLY IN CONNECTION WITH ELECTRIC AND MAGNETIC ENERGY.
General Nature of the Operators. -
-
355
S.H. Vibrations, and the effective R', L', Kf, and #'.
356
... Impulsive Inductance and Permittance. General Theorem relating to the Electric and Magnetic Energies. -
359
xii
ELECTRICAL PAPERS.
General Theorem of Dependence of Disturbances solely on the Curl of the Impressed Forcive. -
Examples of the Forced Vibrations of Electromagnetic Systems. -
.... Induction-Balances General, Sinusoidal, and Impulsive. -
-
The Resistance Operator of a Telegraph Circuit.
The Distortionless Telegraph Circuit. -
The Use of the Resistance-Operator in Normal Solutions. -
-
PAGE
361 363 366 367 369 371
ART. 43.
ON ELECTROMAGNETIC WAVES, ESPECIALLY IN RELATION TO THE VORTICITY OF THE IMPRESSED FORCES AND THE FORCED VIBRATIONS OF ELEC-
;
TROMAGNETIC SYSTEMS.
PART 1. Summary of Electromagnetic Connections. -
-
-
375
Plane Sheets of Impressed Force in a Nonconducting
Dielectric.
376
.... Waves in a Conducting Dielectric. How to remove the Distortion due to the Conductivity.
378
Undistorted Plane Waves in a Conducting Dielectric. -
379
Practical Application. Imitation of this Effect. -
-
379
Distorted Plane Waves in a Conducting Dielectric. -
-
381
Effect of Impressed Force. True Nature of Diffusion in Conductors. -
...
384 385
Infinite Series of Reflected Waves. Remarkable Identi-
ties. Realized Example.
387
Modifications made by Terminal Apparatus. Certain
Cases easily brought to Full Realization. -
-
-
390
Note A. The Electromagnetic Theory of Light. -
-
392
NoteB. The Beneficial Effect of Self-Induction. -
393
Note C. The Velocity of Electricity. -
-
-
-
393
PART 2. Note on Part 1. The Function of Self-induction in the
Propagation of Waves along Wires. -
-
396
PART 3. Spherical Electromagnetic Waves. -
-
-
402
The Simplest Spherical Waves.
-
-
403
Construction of the Differential Equations connected with
a Spherical Sheet of Vorticity of Impressed Force. -
406
Practical Problem. Uniform Impressed Force in the
Sphere.
409
Spherical Sheet of Radial Impressed Force. -
-
-
414
CONTENTS.
xiii
Single Circular Vortex Line.
An Electromotive Impulse. wi = l.
PAGE 414
-
-
-
-
417
Alternating Impressed Forces.
-
m Conducting Medium,
= 1.
m A Conducting Dielectric,
= 1.
-
418
420
422
Current in Sphere constrained to be uniform. -
-
-
423
PART 4. Spherical "Waves (with Diffusion) in a Conducting
Dielectric.
The Steady Magnetic Field due to /Constant.
-
-
Variable State when pj p ;= 2 . First Case. Subsiding/. -
Second Case. / Constant.
Unequal p1 and p2. General Case. -
-
-
-
-
Fuller Development in a Special Case. involving Irrational Operators.
Theorems
The Electric Force at the Origin due iofv at r = a.
-
Effect of uniformly magnetizing a Conducting Sphere
surrounded by a Nonconducting Dielectric.
-
-
....... Diffusion of Waves from a Centre of Impressed Force in a Conducting Medium.
Conducting Sphere in a Nonconducting Dielectric. Circular Vorticity of e. Complex Keflexion. Special very Simple Case.
Same Case with Finite Conductivity. Sinusoidal Solution. Resistance at the Front of a Wave sent along a Wire. -
Reflecting Barriers.
Construction of the Operators y1 and y .
...
Thin Metal Screens.
K Solution with Outer Screen ; x = oo ; /constant. -
-
PART 5.
Alternating/ with Reflecting Barriers. Forced Vibrations,
Cylindrical Electromagnetic Waves.
....
Mathematical Preliminary.
Longitudinal Impressed E.M.F. in a Thin Conducting
Tube.
-
-
Vanishing of External Field. J0a = 0. -
-
-
-
Case of Two Coaxial Tubes. -
-
-
-
-
-
424 425 425 425 426
427 429
430
432
433 435 436 438 439 440 441 442
443 444
447 448 449
xiv
ELECTRICAL PAPERS.
Perfectly Reflecting Barrier. Conduction Current.
Its Effects.
Vanishing of
-
# = and #=oo. -
E F H = ,9 0. Vanishing of
all over, and of and
also
internally.
= .s and #, = 0.
Separate Actions of the Two Surfaces of curl e.
Circular Impressed Force in Conducting-Tube.
-
Cylinder of Longitudinal curl of e in a Dielectric. -
-
Filament of curl e. Calculation of Wave. -
-
-
PART 6. Cylindrical Surface of Circular curl e in a Dielectric.
-
Jla = 0. Vanishing of External Field. -
y = i. Unbounded Medium.
s=0. Vanishing of External E.
Effect of suddenly Starting a Filament of e. -
-
-
Sudden Starting of e longitudinal in a Cylinder. -
-
Cylindrical Surface of Longitudinal /, a Function of and*.
Conducting Tube, e Circular, a Function of and t. -
ART. 44.
THE GENERAL SOLUTION OF MAXWELL'S ELECTRO-
MAGNETIC EQUATIONS IN A HOMOGENEOUS ISOTROPIC MEDIUM, ESPECIALLY IN REGARD TO THE DERIVATION OF SPECIAL SOLUTIONS, AND THE
FORMULAE FOR PLANE WAVES.
.... Equations of the Field.
General Solutions.
Persistence or Subsidence of Polar Fields. -
Circuital Distributions.
Distortionless Cases.
First Special Case.
Second Special Case. -
Impressed Forces.
Primitive Solutions for Plane Waves. -
-
-
Fourier-Integrals.
Transformation of the Primitive Solutions (17). .
-
-
-
Special Initial States.
PAGE 451 451
452 452 453 454 455 456 457 458 459 459 460 461
466 467
468 469 469 470 470 471 472 473 473 474 475 476
CONTENT.
xv
Arbitrary Initial States.
-
Evaluation of Fourier-Integrals. -
...
Interpretation of Results.
POSTCRIPT. On the Metaphysical Nature of the Propagation of the
Potentials.
PAGE 477 478 479
483
ART. 45. LIGHTNING DISCHARGES, ETC. -
486
ART. 4G. PRACTICE VERSUS THEORY. ELECTROMAGNETIC
WAVES. -
488
ART. 47. ELECTROMAGNETIC WAVES, THE PROPAGATION OF POTENTIAL, AND THE ELECTROMAGNETIC EFFECTS OF A MOVING CHARGE.
PART 1. The Propagation of Potential. PART 2. Convection Currents. Plane Wave.
....
490 492
PART 3. A Charge moving at any Speed < v. -
494
PART 4. Eolotropic Analogy.
-
496
ART. 48. THE MUTUAL ACTION OF A PAIR OF RATIONAL
CURRENT-ELEMENTS.
500
ART. 49. THE INDUCTANCE OF UNCLOSED CONDUCTIVE CIR-
CUITS.
502
ART. 50. ON THE ELECTROMAGNETIC EFFECTS DUE TO THE MOTION OF ELECTRIFICATION THROUGH A DI-
ELECTRIC.
Theory of the Slow Motion of a Charge.
504
The Energy and Forces in the Case of Slow Motion. -
-
-
505
General Theory of Convection Currents.
508
Complete Solution in the Case of Steady Rectilinear Motion.
Physical Inanity of ^. -
-
510
Limiting Case of Motion at the Speed of Light. Application to
a Telegraph Circuit. -
-
-
511
Special Tests. The Connecting Equations.
-
-
513
The Motion of a Charged Sphere. The Condition at a Surface of
Equilibrium (Footnote).
-
-
-
514
The State when the Speed of Light is exceeded. -
515
A Charged Straight Line moving in its own Line.
-
-
-
516
A Charged Straight Line moving Transversely. -
-
..... A Charged Plane moving Tranversely.
... A Charged Plane moving in its own Plane. -
517 517 519
xvi
ELECTRICAL PAPERS.
PAGE
ART. 51. DEFLECTION OF AN ELECTROMAGNETIC WAVE BY
MOTION OF THE MEDIUM. -
519
ABT. 52. ON THE FORCES, STRESSES, AND FLUXES OF ENERGY IN THE ELECTROMAGNETIC FIELD.
-
(Abstract).
-
General Remarks, especially on the Flux of Energy. -
-
On the Algebra and Analysis of Vectors without Quaternions.
Outline of Author's System. -
On Stresses, irrotational and rotational, and their Activities.
-
The Electromagnetic Equations in a Moving Medium.
The Electromagnetic Flux of Energy in a Stationary Medium.
Examination of the Flux of Energy in a Moving Medium, and
Establishment of the Measure of " True " Current.
-
-
Derivation of the Electric and Magnetic Stresses and Forces from the Flux of Energy.
Shorter Way of going from the Circuital Equations to the Flux of
Energy, Stresses, and Forces.
Some Remarks on Hertz's Investigation relating to the Stresses.
Modified Form of Stress-Vector, and Application to the Surface
separating two Regions.
Quaternionic Form of Stress-Vector. Remarks on the Translational Force in Free Ether.
...
Static Consideration of the Stresses. Indeterminateness. .
-
Special Kinds of Stress Formulae statically suggested. -
-
Remarks on Maxwell's General Stress
A worked-out Example to exhibit the Forcives contained in
Different Stresses. -
A Definite Stress only obtainable by Kinetic Consideration of the
Circuital Equations and Storage and Flux of Energy. -
APPENDIX. Extension of the Kinetic Method of arriving at the Stresses to cases of Non-linear Connection between the
.... Electric and Magnetic Forces and the Fluxes. Preservation
of Type of the Flux of Energy Formula.
Example of the above, and Remarks on Intrinsic Magnetization when there is Hysteresis.
ABT. 53. THE POSITION OF 4?r IN ELECTROMAGNETIC UNITS. -
521 524
528 533 539 541
543
548
550 552
554 556 557 558 561 563
565
568
570
573 575
INDEX,
579
ELECTRICAL PAPERS.
XXXI. ON THE ELECTROMAGNETIC WAVE-SURFACE.
[PhU. May., June, 1885, p. 397, S. 5, vol. 19.]
MAXWELL showed (Electricity and Magnetism, vol. ii., art. 794) that his
equations of electromagnetic disturbances, on the assumption that the
electric capacity varies in different directions in a crystal, lead to the
Fresnel form of wave-surface. There is no obscurity arising from the
ignored wave of normal disturbance, because the very existence of a
plane wave requires that there be none. In fact, the electric displace-
ment and the magnetic induction are both in the wave-front, and are
perpendicular to one another. The magnetic force and induction are
parallel, on account of the constant permeability; whilst the electric
force, though not parallel to the displacement, is yet perpendicular to
the magnetic induction (and force) ; the normal to the wave-front, the
electric force, and the displacement being in one plane. The ray is also
in this plane, perpendicular to the electric force. There are of course
two rays for (in general) every direction of wave-normal, each with
separate electromagnetic variables to which the above remarks apply.
It is easily proved, and it may be legitimately inferred without a
formal demonstration, from a consideration of the equations of induction,
that if we consider the dielectric to be isotropic as regards capacity, but
eolotropic as regards permeability, the same general results will follow,
if we translate capacity to permeability, electric to magnetic force, and
electric displacement to magnetic induction. The three principal
velocities will be (c/Xj)-*, (c/*2 )-i, and (cfi3 )-t, if c is the constant value
^ of the capacity, and /xp 2 fj.. ,
are the three principal permeabilities.
The wave-surface will be of the same character, only differing in the
constants.
But a dielectric may be eolotropic both as regards capacity and
permeability. The electric displacement is then a linear function of
the electric force, and the magnetic induction another linear function
of the magnetic force. The principal axes of capacity, or lines of
parallelism of electric force and displacement, cannot, in the general
case, be assumed to have any necessary relation to the principal axes of
permeability, or lines of parallelism of magnetic force and induction.
H.E.P. VOL. ii.
A
2
ELECTRICAL PAPERS.
Disconnecting the matter altogether from the hypothesis that light
consists of electromagnetic vibrations, we shall inquire into the conditions of propagation of plane electromagnetic waves in a dielectric which is eolotropic as regards both capacity and permeability, and
determine the equation to the wave-surface. For any direction of the normal (to the wave-front, understood) there
are in general two normal velocities, i.e., there are two rays differently
inclined to the normal whose ray-velocities and normal wave-velocities
are different. And for any direction of ray there are in general two
ray-velocities, i.e., two parallel rays having different velocities and
wave-fronts.
In any wave (plane) the electric displacement and the magnetic induction must be always in the wave-front, i.e., perpendicular to the normal. But they are only exceptionally perpendicular to one another.
In any ray the electric force and the magnetic force are both perpendicular to the direction of the ray. But they are only exceptionally
perpendicular to one another. The magnetic force is always perpendicular to the electric displace-
ment, and the electric force perpendicular to the magnetic induction. This of course applies to either wave. If we have to rotate the plane
through the normal and the magnetic force through an angle to bring it to coincide with the magnetic induction, we must rotate the plane through the normal and the electric displacement through the same angle in the same direction to bring it to coincide with the electric
force, the axis of rotation being the normal itself.
In the two waves having a common wave-normal, the displacement of either is parallel to the induction of the other. And in the two rays having a common direction, the magnetic force of either is parallel to
the electric force of the other.
Nearly all our equations are symmetrical with respect to capacity and permeability ; so that for every equation containing some electric variables there is a corresponding one to be got by exchanging electric
force and magnetic force, etc. And when the forces, inductions, etc.,
are eliminated, leaving only capacities and permeabilities, these may be
exchanged in any formula without altering its meaning, although its
immediate Cartesian expansion after the exchange may be entirely different, and only convertible to the former expression by long
processes.
If either /* or c be constant, we have the Fresnel wave-surface.
Perhaps the most important case besides these is that in which the
principal axes of permeability are parallel to those of capacity. There
are then six principal velocities instead of only three, for the velocity
of a wave depends upon the capacity in the direction of displacement
as well as upon the permeability in the direction of induction. For
^ ^ instance, if /x15 2,
and
c
1?
c 2,
c3,
are the
principal
permeabilities
and
^ capacities, arid the wave-normal be parallel to the common axis of
and Cj, the other principal axes are the directions of induction and dis-
placement, and the two normal velocities are (^3)'* and (c^.2}~^ The principal sections of the wave-surface in this case are all ellipses
ON THE ELECTROMAGNETIC WAVE-SURFACE.
3
(instead of ellipses and circles, as in the one-sided Fresnel-wave) ; and two of these ellipses always cross, giving two axes of single-ray velocity. But should the ratio of the capacity to the permeability be the same for
all the axes (/V^ = = /*2/c2 />i3/c3 ), the wave-surface reduces to a single
ellipsoid, and any line is an optic axis. There is but one velocity, and
no particular polarization. If the ratio is the same for two of the axes,
the third is an optic axis.
Owing to the extraordinary complexity of the investigation when
written out in Cartesian form (which I began doing, but gave up aghast),
some abbreviated method of expression becomes desirable. I may also
add, nearly indispensable, owing to the great difficulty in making out
the meaning and mutual connections of very complex formulae. In fact
the transition from the velocity-equation to the wave-surface by proper
elimination would, I think, baffle any ordinary algebraist, unassisted by
some higher method, or at any rate by some kind of shorthand algebra,
I therefore adopt, with some simplification, the method of vectors,
which seems indeed the only proper method. But some of the principal
results will be fully expanded in Cartesian form, which is easily done.
And since all our equations will be either wholly scalar or wholly vector,
the investigation is made independent of quaternions by simply defining
a scalar product to be so and so, and a vector product so and so. The
investigation is thus a Cartesian one modified by certain simple abbre-
viated modes of expression.
I have long been of opinion that the sooner the much needed intro-
duction of quaternion methods into practical mathematical investigations
in Physics takes place the better. In fact every analyst to a certain
extent adopts them : first, by writing only one of the three Cartesian
scalar equations corresponding to the single vector equation, leaving the
others to be inferred ;
and
next,
by writing
the
first
only
of
the
three
products which occur in the scalar product of two vectors. This,
systematized, is I think the proper and natural way in which quaternion
methods should be gradually brought in. If to this we further add the
use of the vector product of two vectors, immensely increased power is
given, and we have just what is wanted in the tridimensional analytical
investigations of electromagnetism, with its numerous vector magni-
tudes.
It is a matter of great practical importance that the notation should
be such as to harmonize with Cartesian formulse, so that we can pass
from one to the other readily, as is often required in mixed investiga-
tions, without changing notation. This condition does not appear to
me to be attained by Professor Tait's notation, with its numerous letter
-S prefixes, and especially by the
before every scalar product, the
negative sign being the cause of the greatest inconvenience in transitions.
I further think that Quaternions, as applied to Physics, should be
established more by definition than at present ; that scalar and vector
products should be defined to mean such or such combinations, thus
avoiding some extremely obscure and quasi-metaphysical reasoning,
which is quite unnecessary.
The first three sections of the following preliminary contain all we
4
ELECTRICAL PAPERS.
want as
regards
definitions ;
most of the
rest of the preliminary consists
of developments and reference-formula?, which, were they given later,
in the electromagnetic problem, would inconveniently interrupt the
argument, and much lengthen the work.
Scalars and Vectors. In a scalar equation every term is a scalar, or
algebraic quantity, a mere magnitude ; and + and - have the ordinary
signification. But in a vector equation eve :y term stands for a vector,
or directed magnitude, and + and -- are to be understood as com-
pounding like velocities, forces, etc. Putting all vectors upon one side,
we have the general form
A + B + C + D+ ... =0;
where A,
B,
.. . ,
are
any
vectors,
which,
if n
in
number,
may
be
repre-
A sented, since their sum is zero, by the n sides of a polygon. Let v
A A Aft 3 be the three ordinary scalar components of referred to any
set of three rectangular axes, and similarly for the other vectors. This
notation saves multiplication of letters. Then the above equation
stands for the three scalar equations
- ... =o;
- ... =o,
The - sign before a vector simply reverses its direction that is,
negatives its three components.
According to the above, if i, j, k, be rectangular vectors of unit
length, we have
A = +JA + \A^
2
1s.A 3,
........................... (1)
A A A A etc. if ;
v
2,
3 be the components of
referred to the axes of
A kA i, j, k. That is,
is
the
sum
of
the
three
vectors
iA lt
JA 2,
of
3,
A A A lengths lt 2, 3, parallel to i, j, k respectively.
We AB tiralar Product.
define
thus,
p ....................... (2)
A and call it the scalar product of the vectors and B. Its magnitude is A that of x that of B x the cosine of the angle between them. Thus.
^ by (1) and (2),
= Ai,
^= 2 Aj,
^ 3 = Ak;
AN N and in general, being any unit vector,
is the scalar component of
A N parallel to N, or, briefly, the component of A. Similarly,
2 i
=l,
=
J2 l,
k* = l,
because i and i are parallel and of length unity, etc.
=
ij 0,
jk = 0,
ki = 0,
And
AB because i and j, for instance, are perpendicular. Notice that
= BA.
We have also
A* A3
and
.- A
or
A"1 -
A~
A
ON THE ELECTROMAGNETIC WAVE-SURFACE.
5
Thus A" 1 has the same direction as A; its length is the reciprocal of
that of A.
We VAB Vector Product,
define
thus,
XA& VAB
-
i(AJBs
-
AB 3 2)
+
A&) -
+ k(^ 2 - AJ}^ ..... (3)
VAB A and call
the vector product of and B. Its magnitude is that of
A x that of B x the sine of the angle between them. Its direction is
A perpendicular to
and to B with the usual conventional relation
between positive directions of translation and of rotation (the vine
system). Thus, Vrj=k,
Vjk = i,
Vki=j.
Notice that VAB = - VBA, the direction being reversed by reversing the
A order of the letters ;
for, by exchanging
and B in (3), we negative
each term.
Hamilton's V- The operator
may, since the differentiations are scalar, be treated as a vector, of
"* course with either a scalar or a vector to follow it.
P scalar we have the vector
If it operate on a
<> .........................
whose three components are dP/dx, etc. If it operate on a vector A, we have, by (2), the scalar product
and, by (3), the vector product
-
dy
ti
dz J \ dz
dx J
\dx
dy
VA The scalar product
is the divergence of the vector A, the amount
leaving the unit volume, if it be a flux. The vector product (7) is the
curl of A, which will occur below. There are three remarkable theorems
relating to V, viz.,
....................... (8)
(9)
(10)
Starting with P, a single-valued scalar function of position, the rise in its value from any point to another is expressed in (8) as the lineintegral, along any line joining the points, of VPda, the scalar product
of VP and da, the vector element of the curve.
A Then passing from an unclosed to a closed curve, let be any vector
function of position (single-valued, of course). Its line-integral round
6
ELECTRICAL PAPERS.
the closed curve is expressed in (9) as the surface-integral over any
surface bounded by the curve of another vector B, which = VvA. Bc?S is the scalar product of B and the vector element of surface f/S, whose
direction is defined by its unit normal.
Finally, passing from an unclosed to a closed surface, (10) expresses
the surface-integral of any vector C over the closed surface (normal
positive outward), as the volume-integral of its divergence within the
included space.
H Linear Vector Operators. If be the magnetic force at a point, B the induction, E the electric force, and D the displacement, all vectors, then
B--=/*H,
and
D = c;E/47r .................... (11)
H express the relation of B to
and of D to E in a dielectric medium.
If it be isotropic as regards displacement, c is the electric capacity ; and
if it be isotropic as regards induction, /x is the magnetic permeability ;
c and /x are then constants, if the medium be homogeneous, or scalar
functions of position if it be heterogeneous.
We shall not alter the form of the above equations in the case of
eolotropy, when c and p become linear operators. For instance, the
induction will always be /xH, to be understood as a definite vector, got
H from
another vector, in a manner fully defined by (in case we want
H H the developments) the following equations (not otherwise needed). Let
lt ..., and J5j, ..., be the components of
and B referred to any
rectangular axes. Then
B l
(12)
where u /* , etc., are constants; which may have any values not making
HB = negative; with the identities /x 12 /x21 , etc. Or,
when the components are those referred to the principal axes of per-
meability, /Xj, /x2, /x3 being the principal permeabilities, all positive.
H Inverse Operators. Since B = /xH, we have
=1
/x~ B,
where
1
/x"
is
the
operator inverse to /x. When referred to the principal axes, we have
*'--,
**i
=
ri
,
/*
/-,'-th
But when referred to any rectangular axes, we have
x
by solution of (12). The accents belong to the inverse coefficients. The rest may be written down symmetrically, by cyclical changes of
the figures. In the index-surface the operators are inverse to those in the wave surface.
A Conjugate Property. The following property will occur frequently.
and B being any vectors,
................................ (16)
ON THE ELECTROMAGNETIC WAVE-SURFACE.
7
A or the scalar product of and pJB equals that of B and /*A. It only
requires writing out the full scalar products to see its truth, which
= results from the identities /x12 /x91 , etc. Similarly,
A/xcB = /zAcB = c/xAB,
etc. ,
AB = A/z/x^B = /zA/^B,
etc. ,
where in the first line c is another self-conjugate operator.
E D is expressed in terms of
similarly
to
(12)
by
coefficients
n c ,
c la>
etc. ;
or,
as
in
(13),
by
the
principal
capacities
cv
c 2,
c3 .
A Theorem. The following important theorem will be required.
and
B being any vectors,
/y^VAB-^V/iA/iB .......................... (17)
For completeness a proof is now inserted, adapted from that given by
VAB A Tait. Since
is perpendicular to and B, by definition of a vector
product, therefore
AVAB = 0, and BVAB = 0,
by definition of a scalar product. Therefore
A/x/*-iVAB = 0,
and
B/^VAB = 0,
w~ by introducing
= l
1.
Hence
0,
and
/xB/x-!VAB = 0,
VAB by the conjugate property ;
that
is,
1
/*~
is perpendicular to /xA and
to /*B. Or
where h is a scalar. Or
by operating by /x. To find h, multiply by any third vector C (not to
A be in the same plane as and B), giving
therefore
>'
by the conjugate property. Now expand this quotient of two scalar
products, arid it will be found to be independent of what vectors A, B, C
may be. Choose them then to be i, j, k, three unit vectors parallel to
the
principal
axes
of /x.
Then
by the i, j, k properties before mentioned. This proves (17).
Transformation-Formula. The following is very useful. A, B, C
being any vectors,
VAVBC = B(CA)-C(AB) ........................ (18)
Here CA and AB are scalar products, merely set in brackets to separate distinctly from the vectors B and C they multiply. This formula is
evident on expansion.
ELECTRICAL PAPERS.
H E The Equations of Induction.
and
being the electric and magnetic
forces at a point in a dielectric, the two equations of induction are
[vol. I., p. 449, equations (22), (23)]
/>iH; ................... ........ ,.(20)
c and /z being the capacity and permeability operators, and curl standing
VV for
as defined in equation (7). Let T and G be the electric and the
magnetic current, then
r = cE/47r,
G = /uH/47r............... ....... (21)
The dot, as usual, signifies differentiation to the time. The electric
energy is EcE/87r per unit volume, and the magnetic energy H/xH/87r
A per unit volume. If
is Maxwell's vector potential of the electric
current, we have also
curlA = /*H,
E=-A..................... (21o)
Similarly, we may make a vector Z the vector potential of the magnetic
current, such that [vol. I., p. 467]
-curlZ = cE,
H= -Z...................... (22)
The complete magnetic energy of any current system may, by a well-known transformation, be expressed in the two ways
the 2 indicating summation through all space. Similarly, the electric energy, if there be no electrification, may be written in the two ways
If there be electrification, we have also another term to add, the real
electrostatic energy, in terms of the scalar potential and electrification.
And if there be impressed electric force in the dielectric, part of G will
be imaginary magnetic current, analogous to the imaginary electric
current which may replace a system of intrinsic magnetization.
Plane Wave. Let there be a plane wave in the medium. Its direction
N is defined by its normal. Let then
be the vector normal of unit
length, and z be distance measured along the normal. If v be the
velocity of the wave-front, the rate the disturbance travels along the
normal, or the component parallel to the normal of the actual velocity
of propagation of the disturbance, we have
K=f(z-vt), if the wave be a positive one, as we shall suppose, giving
< 23 >
H applied to or E. Next, examine what the operator VV or curl becomes when, as at
present, the disturbance is assumed not to change direction, but only
ON THE ELECTROMAGNETIC WAVE-SURFACE.
9
magnitude, as we pass along the normal. Apply the theorem of Version (9) to the elementary rectangular area bounded by two sides parallel to
E of length a, and two sides of length b perpendicular to E and in the same plane as E and the normal N. Since its area is ab, and b = dz sin 6,
Wave front
and the two sides b contribute nothing to the line-integral, we find that
curl =
VN-^,
(24)
H applied to E or or other vectors, in the case of a plane wave. Using
this, and (23), in the equations of induction (19), (20), they become
VN =
dz
dz
Here, since the ^-differentiation is scalar, and occurs on both sides, it
VNH= may be dropped, giving us
-wE, .............................. (25)
VNE= ^H ............................... (26)
The induction and the displacement are therefore necessarily in the wave front, by the definition of a vector product, being perpendicular to
N. Also the displacement is perpendicular to the magnetic force, and
the induction is perpendicular to the electric force. Index-Surface. Let *
be a vector parallel to the normal, whose length is the reciprocal of the
normal velocity v. It is the vector of the index-surface. By (25) and
(26) we have cE = - VsH,
therefore
- E = c~ lVsH ;
(28)
and
/xH= VsE, -therefore
(29)
Now use the theorem (17). Then, if
* [In order to secure the advantage of black letters for vectors, I have changed
the notation thus :
The
original
<r is now
s ;
p
is r ;
is b ; y is g ; and a is a.]
10
ELECTRICAL PAPERS.
be the products of the principal permeabilities and capacities, the theorem gives, applied to (28) and (29),
... ........... . ...... (31)
wH = V/xs/xE ....................... ........ (32)
H Putting the value of given by (32) in (28) first, and then the value of E given by (31) in (29), we have
......................... (33)
(34)
To these apply the transformation-formula (18), giving
and
-mcE = /xs(s^E)-/xE(s/xs), ..................... (33a)
= - w/*H
-
cs(scH) cH(scs),
...................... (340)
where the bracketed quantities are scalar products. Put in this form,
= {(s^s)/x-mc}E /xs(s/>tE), ........................ (35)
{(scs)c-7i/t*}H=es(scH), ........................ (36)
and perform on them the inverse operations to those contained in the {}'s, dividing also by the scalar products on the right sides. Then
E
s/uE
(s/iS)/x - me
(37)
JL = __^_
scH
-
(scs)c np.
(38)
Operate by c on (37) and by //, on (38), and transfer all operators to the denominators on the right. Then
X-** say> ................... (39)
(40)
(It should be noted that, in thus transferring operators, care should be taken to do it properly, otherwise it had better not be done at all.
Thus, we have by (37),
and the left c and the right //, are to go inside the {}. Operate by
and
then
again
by
+1 {} ,
thus
cancelling
the
1
j}" ,
giving
=-
l
/xs {(s//.s)//. mc}c~ r lo
Here we can move c" 1 inside, giving
and now operating by p~ l t it may be moved inside, giving
as in (39).)
ON THE ELECTROMAGNETIC WAVE-SURFACE.
tl
We can now, by (39) and (40), get as many forms of the index-
We equation as we please.
know that the displacement is perpendicular
to the normal, and so is the induction. Hence
8b 1
=
0,
= sb 2
0, ......................... (41)
where
bj
and
b 2
are
the
above
vectors,
in
(39)
and
(40),
are
two
equivalent equations of the index-surface.
Also,
operate
on
(39)
by
1
s/wr ,
and
on
(40)
by
1
Sty*" ,
and
the
left
members become unity, by the conjugate property ; hence
\l =
f*&c-
l,
=l d3/x-ib 2
.................... (42)
are two other forms of the index-equation. (41) and (42) are the simplest forms. More complex forms are created with that surprising ease which is characteristic of these operators ; but we do not want any
more. When expanded, the different forms look very different, and no
one would think they represented the same surface. This is also true of the corresponding Fresnel surface, which is comparatively simple in
expression. In any equation we may exchange the operators /x and c. Put = s Ni'" 1 in any form of index-equation, and we have the velocity-
equation, a quadratic in v2 giving the two velocities of the wave-front.
And if we pub N# = p, thus making p a vector parallel to the normal of
length equal to the velocity, it will be the vector of the surface which is the locus of the foot of the perpendicular from the origin upon the
tangent-plane to the wave-surface.
By (33ft), remembering that s is parallel to the normal, we see that
12
ELECTRICAL PAPERS.
But s the vector of the index-surface being
=
Nv" 1
=
2
p#~ ,
we
have,
by
(47), dividing it by ^,
sr=l .................................... (48)
To find the wave-surface, we must therefore let 8 be variable and
eliminate it between (48) and any one of the index-equations. This is
not so easy as it may appear.
General considerations may lead us to the conclusion that the equation
to the wave-surface and that to the index-surface may be turned one
into the other by the simple process of inverting the operators, turning
c into c~ l and ^ into p~ l. Although this will be verified later, any form
of index-equation giving a corresponding form of wave by inversion of operators, yet it must be admitted that this requires proof. That it is true when one of the operators c or p is a constant does not prove that it is also true when we have the inverse compound operator
1
{(scs)/*"
-nc~ l }~ 1
containing both
c
and /z,
neither
being constant.
I
have not found an easy proof. This will not be wondered at when the
similar investigations of the Fresnel surface are referred to. Professor
Tait, in his "Quaternions," gives two methods of finding the wave-
surface ;
one
from
the
velocity-equation,
the
other
from
the
index-
equation. The latter is rather the easier, but cannot be said to be very obvious, nor does either of them admit of much simplification. The difficulty is of course considerably multiplied when we have the two
operators to reckon with. I believe the following transition from index
to wave cannot be made more direct, or shorter, except of course by
omission of steps, which is not a real shortening.
Given
*
1
= --^1 ........... (49) (39) to
8^ = 0, ............................ (50) -(41) to = rs=l ............................. (51) (48) bis
We Eliminate s and get an equation in r.
have also
which will assist later.
= 1
/KSe- !)^!,
.................... (52)
(42) bis
By (49) we have
= S (s/>ts)c- 1 b 1 -w/>i- 1 b1 ......................... (53)
Multiply by bj and use (50) ; then
-
= )-m(b sXb t (s/>
b 1
lC
1
t-ib
1/J
1
)
.....................
(54)
By
differentiation,
s
being
variable,
and
therefore
b x
also,
= 20s/>ts)(b1c- 1 b1 )4-2(s/xs)0b1 c- 1 b1 ) - 2m(db1/*- 1b1 ) ....... (55)
Also, differentiating (53),
= + ^ da
2(ds/zs)c~ 1 b 1
(BftB)rfc~ 1 b 1
-
1
mdfjL'
;
and
multiplying
this
by
2b x
gives
bl ). ...(56)
ON THE ELECTROMAGNETIC WAVE-SURFACE.
13
Subtract
(55)
from
(56)
and
halve
the
result ;
thus obtaining
or
= {b 1 -(b 1 c- 1 b1 )/xs}^s
....................... (57)
In the last five equations it will be understood that da and db, are
differential vectors, and that da^a is the scalar product of da and /xs,
etc. ;
also in getting (56) from the preceding equation
we
have
\l
\dc~
=
bjC-^bj
=
l
d\c-
\> lt
etc.
Equation (57) is the expression of the result of differentiating (50),
with db eliminated. x Now (57) shows that the vector in the {} is perpendicular to da, the
variation of a. But by (51) we also have, on differentiation,
= rds
................................... (58)
Hence r and the { } vector in (57) must be parallel. This gives
hr^-^c-^a, ........................... (59)
\ where k is a scalar. If we multiply this by c~ l and use (52), we
obtain
rc^b^O; ............................... (60)
\ or, by (49), giving in terms of cE,
rE = 0,
................................... (61)
a very important landmark. The ray is perpendicular to the electric
force.
Similarly, if we had started from instead of (49), (50), and (52)
H the corresponding equations, viz.,
with of course the same equation (51) connecting r and a, we should
have arrived at
= &'r b2 -(b2/M-ib2 )cs; .......................... (62)
h' being a constant, corresponding to (59) ; of this no separate proof is
needed, as it amounts to exchanging /x and c and turning E into H, to
make (39) become (40). And from (62), multiplying it by ft~ 1 b2,
we arrive at
= r/A -ib 2 0,
or
rH = 0, ..................... (63)
corresponding to (61). The ray is thus perpendicular both to the electric and to the magnetic force. The first half of the demonstration
is now completed, but before giving the second half we may notice some
other properties.
Thus, to determine the values of the scalar constants h and h'.
Multiply (59) by a, and use (50) and (51) ; then
h= -
-
14
ELECTRICAL PAPERS.
the second form following from (54). Insert in (59), then
(64)
gives
r
explicitly
in
terms
of /*s
and
b 1?
the
latter
of which
is
known
in
terms of the former by (49).
Multiply
this
by
1
fi" ^,
using (50) ;
then
-m- r/^-ib^
1 ............................... (65)
Similarly we shall find
h'=
-
^(bjje-ng,
............................. (66)
' ........................ (67)
and, corresponding to (65), we shall have
= -IT Tc- l b 2
1 ............................... (68)
Now to resume the argument, stopped at equation (63). Up to
equation (59) the work is plain and straightforward, according to rule
in fact, being merely the elimination of the differentials, and the getting
of an equation between r and s. What to do next is not at all obvious.
From (59), or from (64), the same with h eliminated, we may obtain all
sorts
of scalar
products
containing
r
and
b 1?
and
if we
could
put
b x
explicitly in terms of r, (60) or (65) would be forms of the wave-surface
equation. From the purely mathematical point of view no direct way
presents itself; but (61) and (63), considered physically as well as
mathematically, guide us at once to the second half of the transforma-
tion from the index- to the wave-equation. As, at the commencement,
we found the induction and the displacement to be perpendicular to the
normal, so now we find that the corresponding forces are perpendicular
to the ray. There was no difficulty in reaching the index-equation
before, when we had a single normal with two values of v the normal
velocity, and two rays differently inclined to the normal. There should
then be no difficulty, by parallel reasoning, in arriving at the wave-
surface equation from analogous equations which express that the ray
is perpendicular to the magnetic and electric forces, considering two
parallel rays travelling with different ray-velocities with two differently
inclined wave-fronts.
Now, as we got the index-equation from
VNH= --roE, ........................... (25) bis
VNE = p/*H, ........................... (26) Us
Mwe must have two corresponding equations for one ray-direction. Let
be a unit vector defining the direction of the ray, and w be the ray-
velocity, so that
= wM r
................................... (69)
Operate on (25) and (26) by VM, giving
VMVNH= -
VMVNE=
ON THE ELECTROMAGNETIC WAVE-SURFACE.
15
Now use the formula of transformation (18), giving
N(HM) - H(MN) = -
N(EM) - E(MN) = v
HM EM But
= and
= 0, as proved before. Also v = w(NN), or the
wave-velocity is the normal component of the ray-velocity. Hence
.............................. (70)
.............................. (71)
which are the required analogues of (25) and (26). Or, by (69),
H = VrcE, -E = Vr/*H
.................................. (72) .................................. (73)
are the analogues of (28) and (29). The rest of the work is plain.
H Eliminating E and successively, we obtain
= E + Vr/zVrcE,
= H + VrcVr/xH;
and, using the theorem (17), these give
=E+
which, using the transformation-formula (18), become
= E + mfi- l T(
H =
+
wc-
1
r(c
or, rearranging, after operating by ^ and c respectively,
i)mc
-
/x}E
=
1
mr(ft~ rcE),
Or
=
_^
r
r =g l , say,
(74)
TT
_,
= & = = -~
c- lifjR
=-r
7
1
(rcr !)/*
-
n~ rl c
say
75
()
These give us the four simplest forms of equation to the wave. For,
since rE = = rH, we have
=
rg! 0,
rg2 =
(76)
Also, operating on (74) by p~ l rc and on (75) by c" 1!/* we get
two other forms.
= 1
/x~ rcg1 l,
c -1r/>tg2 =l,
(77)
gl
and
g2
differ
from
b x
and
b 2
merely
in
the
change
from
a
to
r,
and
in the inversion of the operators. The two forms of wave (76) are
analogous to (41), and the two forms (77) analogous to (42), inverting
operators and putting r for s.
Similarly,, if the wave-surface equation be given and we require that
16
ELECTRICAL PAPERS.
of the index-surface, we must impose the same condition rs = 1 as before,
and eliminate r. This will lead us to
scg^O,
*P8i=-> ....................... (78)
corresponding to (60) and (65) ; and
=
s/*g2 0,
scg2 =-rc,
............. .......... (79)
corresponding to (63) and (68); and the first of (78) and (79) are
equivalent to
or the displacement and the induction are perpendicular to the normal.
This completes the first half of the process ; the second part would be
the repetition of the already given investigation of the index-equation.
The vector rate of transfer of energy being VEH/4?r in general, when
a ray is solitary, its direction is that of the transfer of energy. It seems
reasonable, then, to define the direction of a ray, whether the wave is
plane or not, as perpendicular to the electric and the magnetic forces.
On this understanding, we do not need the preliminary investigation of
the index-surface, but may proceed at once to the wave-surface by the
investigation (69) to (77), following equations (25) and (26). The following additional useful relations are easily deducible :
(25) and (26) we get
From
^ ............................... (
and from (72) and (73),
-s.................................... <">
Also, from either set,
EcE = H/xH, ..................... .....-..-....:. (8-2)
expressing the equality of the electric to the magnetic energy per unit
volume (strictly, at a point).
Some Cartesian Expansions. In the important case of parallelism of
the principal axes of capacity and permeability, the full expressions for
the index- or the wave-surface equations may be written down at once
from the scalar product abbreviated expressions. Thus, taking any
equation to the wave, as the first of (76), for example, igl = t gl being
given in (74), take the axes of coordinates parallel to the common
principal axes of c and /*;
so that we can
employ cv
c 2,
c a,
the
principal
capacities, and pv p.2, /*3 the principal permeabilities in the three com-
We ponents of gr
then
have,
x t
y^z
being
the
coordinates
of r,
X2
2
I/
+
Z2
~l
-~
~
'
where
= r/x l i
h H---
A*i f*a /*3
In (83) we may exchange the c's and /x's, getting the second of (76).
Similarly the first of (77) gives
ON THE ELECTROMAGNETIC WAVE-SURFACE.
17
as another form, in which, again, the yu's and c's may be exchanged (not
m forgetting to change into n) to give a fourth form.
These reduce
= = C i
c 2
cy
to
the
Fresnel
surface
if
either
==
/z x /x 2 /*3
or
Let x = to find the sections in the plane y, z. The first denominator
in (83) gives
-r -
representing an ellipse, semiaxes
% = (%)-* and
The other terms give
Or
% an
ellipse,
semiaxes
v
31
=
(c^)
~
*
and
= (ca/^1 )~*. Similarly, in the
plane 2, a; the sections are ellipses whose semiaxes
are
#
21 ,
fl23 ,
and
v
12 ,
= v 32 ,
where
for
brevity
vrs
~*
(crfj,s )
;
and in the plane #, y, the ellipses
have semiaxes %,
and
32 ,
13 , #12.
In one of the principal planes two of the ellipses intersect, giving
four places where the two members of the double surface unite.
= = If GJ//ZJ
c 2 //x 2
c 3 //A3 ,
we
have
a
single
ellipsoidal
wave-surface
whose
equation is
++=1 .............................. 85)
Now,
of
course,
= y< %> 12
etc.
When the p and c axes are not parallel, we cannot immediately write
down the full expansion of the wave-surface equation. Proceed thus :
Taking Tgl = as the equation, let
R=
m(i^-
l
i),
and
a
=
m~
g1 1
;
then, by (74) and (76),
r r
He-
p
=
0,
or
ra = 0,
where
= r (Jfc-/x)a.................................. (86)
R is a scalar.
If
15
a 2,
a s
are
the
three
components
of a referred
to
any rectangular axes, and x, y, z the components of r, we have, by (86)
and (12),
x = (Ecu -
y = (Ec21 -
= z
-
(jBc81
% from
which
a lt
ft 2 ,
may
be solved in terms of x,
y,
z \
thus
H.E.P. VOL. II.
18
ELECTRICAL PAPERS.
where, by using (15),
and the rest by symmetry. Then, since
ra
=
xa 1
+
ya.2
+
za
B
=
0,
we get the full expansion. A need not be written fully, as it goes out.
The equation may be written symmetrically, thus,
= 1+ + + I
I
mn(in~ I)(TG~ T)
p - < x2 (c22 BB c33/x22 2c23/x23)
...
where
the
coefficients
of
2
y,
z2 ,
yz,
and
zx
are
omitted.
= and n c-,c9Co whilst
Here m =
where c^, ..., are the inverse coefficients. See equation (15). The
expansion of Tp~ lT is exactly similar, using the inverse /* coefficients.
If in (87) we for every c or /x write the reciprocal coefficients, we
obtain the equation to the index-surface ; that is, supposing x, y, z then
to be the components of s instead of r. And, since sy = N, the unit wave-normal, we have the velocity-equation as follows, in the general
case,
^Va -
-
3 cf8 /4,
+
...... (88)
...},
N N in which JV lf
2,
B are the components of N, or the direction-cosines
^ N of the normal. To show the dependence of v2 upon the capacity and
permeability perpendicular to N, take
= 1,
=
2 Q,
^3 = 0,
which
does not destroy generality, because in (88) the axes of reference are
arbitrary. Then (88) reduces to
-
= o.
When the /x and c axes are parallel, and their principal axes are those of reference, we have
K+ 4)},
(89)
where
%=(c with a similar expression for NcN, and
2 /*3 )~^, etc., as before.
The solution is
...... (90)
NM W where X= Nfuf + Nfu* +
-
2(JV1
2 2
w
1
w2
+
NiNfu^
+
Nf
in which
=-
^= -
M= -
ON THE ELECTROMAGNETIC WAVE-SURFACE.
19
= = Take U L
0, or c2//x2
c3//*3 ; the two velocities (squared) are then
M4 Mi N^ Nfvj, +
+ Nffi*
and
Nfv^ +
+
N reducing to one velocity v23 when
= 1.
t
If,
further,
u 2
=
0,
or
w 3
=
0,
making
always, and
= = CJ//AJ
2//u 2
c 3//x3 ,
Jf=0
........................ (92)
is the single value of the square of velocity of wave-front.
We Directions of E, H, D, and B.
may expand (45) to obtain an
equation for the two directions of the induction and displacement.
Thus, since
A - = i(c'n
t/
the determinant of the coefficients of i, j, k equated to zero gives the
When required equation.
the
principal
axes
of //,
and
c
are
parallel,
the equation greatly simplifies, being then
(93)
where u v ..., are the same differences of squares of principal velocities
D as in (91).
For
v etc., write
v
etc. ;
and we have the same
equa-
tion for the induction directions. For A, etc., write c^, etc., and the
D resulting equation gives the directions of E. For lt etc., write
etc., and the resulting equation gives the directions of H.
Note on Linear Operators and Hamilton's Cubic. (June 12th, 1892.)
[The reason of the ease with which the transformations concerned in
the above can usually be effected is, it will be observed, the symmetrical
property AcB = BcA of the scalar products. But when a linear operator, say c, is not its own conjugate, some change of treatment is required.
Thus, let
D E # = u + + E^ c l
c12 2
c 13 3,
D{
D ^ E ^ = 3
c 81
+ + c32 2 c33 3,
^ E # = + + Di
c 13
c2B 2 c33 3,
We where the nine c's are arbitrary.
may then write
D = cE,
D^c'E,
where
the
operator c'
only
differs
from
c
in
the
exchange
of
c 12
and
c 21 ,
20
ELECTRICAL PAPERS.
etc. It is now D' that is conjugate to D, whilst c' is the operator conjugate to c. It may be readily seen that
D'=/E-VeE,
where
/
is
the
self-conjugate
operator
obtained
by
replacing
c 12
and
c 21 ,
etc., in c by half their sums, and e is a certain vector whose components
are half their differences. Thus,
= %) + + e
-
Ji(c82
- - ij(c13
c sl )
Jk(c21
c12 ).
The conjugate property of scalar products is now
= Bc'A.
That is, in transferring the operator from B to A, we must simultaneously change it to its conjugate. Another way of regarding the matter is as follows : If we put
C= 2
we see, by the above, that
D = cE = E+ i.c1
D' = c'E = Cj.iE + c2 .jE + c3 .kE = (Cj.i + c2 .j + c3 .k)E,
from which we see that c'E is the same as EC, and cE the same as EC'. In the case of AcB, therefore, we may regard it either as the scalar
A product of and cB, or as the scalar product of Ac and B. This
is equivalent to Professor Gibbs's way of regarding linear operators.
That is (converted to my notation),
is the type of a linear operator. It assumes the utmost generality when
i, j, k stand for any three independent vectors, instead of a unit
rectangular system. Professor Gibbs has considerably developed the
theory of linear operators in his Vector Analysis.
w The generalised form of (17) is got thus: Let v and
be any
vectors, then, as before, we have
0= vVvw= vcc~ 1Vvw, = wVvw = wcc^Vvw,
Vvw where the last forms assert that c~ 1
is perpendicular to vc and we,
or parallel to Vvcwc ; that is,
mVvw = cVc'vc'w ',
........................... (A)
from which, by multiplying by a third vector u, we find
m - -- = uVvw c'uWvc'w ==
,
.............................
,T>\ (-D)
which is an invariant.
Hamilton's cubic equation in c is obtained by observing that since (A) is an identity, c being any linear operator, it remains an identity
ON THE ELECTROMAGNETIC WAVE-SURFACE.
21
when c is changed to c - g, which changes c' to c' - #, where g is a scalar constant. For c - g is also a linear operator. Making this substitution in (A) and expanding, we obtain
(m
-
m^
+
m2 2g
-
g*) Vvw
jc'uVc'vc'w - ^(uVc'vc'w + vVc'wc'u + wVc'uc'v)
+
2
#
(c'uVvw
+
c'vVwu
+
c'wVuv)
-
3
#
uVvw
j
= cVc'vc'w - ^(Vc'vc'w + cVvc'w + cVc'vw)
+
2
#
(cVvw
+
Vvc'w
+
Vc'vw)
-
3
#
Vvw,
m m where m,
v
2 are the coefficients of #,
g,
and
2
g
in
the
expansion
of
m the left member of given by (B). Comparing coefficients we see that
#
and
3
g
go
out.
The others give (remembering that we are dealing
with an identity),
Vc'vc'w + c(Vvc'w + Vc'vw) = ?%Vvw,
cVvw +
(Vvc'w
+
Vc r vw)
=
w Vvw. 2
Operate
on
the
first
by
c
and
second
by
2 c
,
and
subtract.
This eliminates
the vector in the brackets, and leaves
cVc'vc'w
-
c 3 Vvw
=
m cVvw :
-
m2c2 Vvw,
where the first term on the left is mVvw. So we have
m + m = m^c
- c2
2
c3
0, ......................... (C)
which is Hamilton's cubic.
If
we
start
instead
with
the
conjugate
operator
f c
we
shall
arrive
at
m'Vvw = c'Vcvcw,
where
W' = ^Lu^Vvvcww
and then, later, to the cubic
+ m = ra' - m(c'
- 2'c' 2
c/3
0,
where m', etc., come from m, etc., by exchanging c and c'. But it may
m m be easily proved that = m', and we may infer from this that 1 = m{
m m and = 2 rti2, on account of the invariantic character of
being pre-
served when c becomes c - g. In fact, putting c =/+ Ve and cf =/- Ve,
Vw where /is self-conjugate, we may independently show that
m-
cuVcvcw c'uVc'vc'w
uVvw
uVvw uVvw
m - m' -
w/u + wV/u/v
uVvw
uVcvcw + vVcwcu + wVcucv uVvw
=
/ = /nVvw +/vVwu +/wVuv = game
with
c = same
with
, c
uVvw
So in Hamilton's cubic (C) we may change c to c', leaving the ra's
22
ELECTRICAL PAPERS.
unchanged ; or else in the m's only ; or make the change in both the c's
and the m's, without affecting its truth.
If the passage from (A) to (C) above be compared with the corre-
sponding transition in Tait's Quaternions (3rd edition, 158 to 160) it
will be seen that that rather difficult proof is simplified (as done above)
by
omitting
altogether
the
inverse
operations
$~ l
and
-l
(^ g)~
and
the
auxiliary operator x ', especially x> perhaps. One is led to think from
Professor Tait's proof that the object of the investigation is to solve
the problem of inverting <. But the mere inversion can be done by
elementary methods. In Gibbs's language, if a, b, c is one set of
vectors, the reciprocal set is a', b', c', given by
a/_Vbc
~aVbc'
b/~_VbcaW
,_ Vab ~cVa
On this understanding, we may expand any vector d in terms of
a, b, c thus :
= + + d a . a'd b . b'd c . c'd.
Similarly, if 1', m', n' is the set reciprocal to 1, m, n, we have r = 1'. lr + m'. mr + n'. nr.
If, then, it be given that
d = <(r) = a.lr + b.mr + c.nr, we see that = lr a'd, etc., so that
r = ^(d) = 1'. a'd + m'. b'd + n'. c'd
inverts <. (This is equivalent to Tait, 173.)
We W see by (A) and (B) that the inverts of u, v, are c' x inverts of
cu, cv, cw; or c x inverts of c'u, c'v, c'w. The cubic (C) may be written
W wcw cu cvcw / c_! _ ,
_ lu/
vc -i y/ + WC -I A I _ c / c _ / ucu/ + vcv/ +
I
')
uVvw I
'J
I
W if u', v', w' are the inverts of u, v,
(or the reciprocal set). In this
identity the operators c and c" 1 may be inverted. When that is done
m m we see that the
of c is the reciprocal of the
of c" 1 .]
Note on Modification of Index-equation when c and //. are Rotational.
[Let c' and /*' be the conjugates to c and /*. Then, by (A), (B), in
last note,
mVvw = p! V^VfjiW = />tV//v//w,
where
^^ m = /^
+ e/* e,
if
/*!,
/x 2 ,
/AS
are
the
principal
permeabilities
of yu, ,
the
self-conjugate
= + operator such that />t />t Ye. With this extension of meaning, we
shall have (treating c and n similarly),
- E = c- 1VsH,
- ?iE = Vc'sc'H,
- mE = c - 1VsV/s/E,
H = /x-i VsE,
mH = V/s/E,
- nE = ^- 1V&Vc'sc'H,
NOTES ON NOMENCLATURE.
23
where the first pair replace (28), (29), the second pair (31), (32), and the third pair (33), (34). Then
= ?fyuH
-
c's(sc'H)
c
/
/
H(sc
s)
replace (33) and (34), and
E~
p'B
s//E (s/x's)// - me'
H
C?B
~~
sc'H (sc's)c' - np
replace (37a), (38a) ; from which two forms of index-equation corresponding to (41) are
S
8
1-
1
(s/x'sjc"
lap.'-
(sc's)/^" 1 - nc'~ l
We obtain impossible values of the velocity for certain directions of the
normal. That is, there could not be a plane wave under the circum-
stances.]
XXXII. NOTES ON NOMENCLATURE.
[The Electrician, Note 1, Sep. 4, 1885, p. 311 ; Note 2, Jan. 26, 1886, p. 227 ; Note 3, Feb. 12, 1886, p. 271.]
NOTE 1. IDEAS, WORDS, AND SYMBOLS.
HOWEVER desirable it may be that writers on electrotechnics should
use a common notation, at least as regards the frequently recurring
magnitudes concerned which notation should not be a difficult matter
to arrange, provided it be kept within practical limits it is perhaps
more desirable that they should adopt a common language, within the
same practical limits, of course. For whilst the use of certain letters
for certain magnitudes requires no more explanation than, for instance,
"Let us call
the
currents
(7r
(7 2,
etc.," it is otherwise with
the language
used when speaking of the magnitudes, as more elaborate explanations
are needed to identify the ideas meant to be expressed.
As regards electric conduction currents, there is a tolerably uniform
usage, and a fairly good terminology. It is seldom that any doubt can
arise as to a writer's meaning, unless he be an ignoramus or a paradoxist, or have unfortunately an indistinct manner of expressing him-
self. I would, however, like to see the word "intensity," as applied to
the electric current, wholly abolished. It was formerly very commonly used, and there was an equally common vagueness of ideas prevalent.
It is sufficient to speak of the current in a wire (total) as " the current,"
or "the strength of current," and when referred to unit area, the
current-density. (In three dimensions, on the other hand, when every-
thing is referred to the unit volume, and the current-density is meant
as a matter of course, it is equally sufficient to call it the current.)
24
ELECTRICAL PAPERS.
It is a matter of considerable practical advantage to have single words for names, instead of groups of words, and it is fortunate that the exist-
ing this
cwoanyd.uctiTohnu-sc,ur"resnptecitfeircmriensoilsotganycead"mmitasy
of very be well
practical called "
adaptation
resistivity,"
and specific conductance
" conductivity," referring
to
the
unit volume.
Resistivity is the reciprocal of conductivity, and resistance of conduct-
ance. When wires are in parallel, their conductances may be more
We easy to manage than their resistances.
have also the convenient
adjectives "conductive" and "resistive," to save circumlocution.
Passing to the subject of magnetic induction, there is considerable
looseness prevailing. There is a definite magnitude called by Maxwell
"the magnetic induction," which may well be called simply "the
induction." It is related to the magnetic force in the same manner as
c"umrargennte-tdiecnspietrymeatboiltihtey.e"lectTrhiics
force.
may
be
(B = ^H.) The ratio p is the
simply called the permeability,
since the word is not used in any other electrical sense. Induction and
permeability may not be the best names, but (apart from their being
understood by mathematical electricians) they are infinitely better than
the long-winded "number of lines of force" (meaning magnetic) and
" conductivity for
lines
of
force,"
the
use of which,
though
defensible
enough in merely popular explanations, becomes almost absurd when
the electrotechnical user actually goes so far as to give them quantita-
tive expression. Conductivity should not be used at all, save in point-
ing out an analogy. It has its own definite meaning.
" Permeability,"
however,
does
not
admit
of
such
easy
adaptation
to
different circumstances as conductivity. Permeability referring to the
unit volume, the word permeance is suggested for a mass, analogous to
We conductance.
have also the adjective "permeable." By adding,
maonrdeo"viemrp,erthmeeapnrceef,i"x
"im," we get "impermeable," "impermeability," for the reciprocal ideas, sometimes wanted. Thus
impermeability, the
reciprocal
of /A,
would
stand
for
the
long-winded
" specific
resistance
to
lines
of
magnetic force."
(The permeance of a
L coil would be Z/47T, if
is its coefficient of self-induction. In the
expression T=^LC* for the magnetic energy of current C in the coil, 4?r
T= does not appear, whilst it does in the form
\ magnetomotive force x
total induction through the circuit -f 47r. It is kirC that is the magneto-
motive force, and LC the induction through the circuit. Thus we have
oppositely acting 47r's. I may here remark that it would be not only a
theoretical but a great practical improvement to have the electric and magnetic units recast on a rational basis. But I suppose there is no chance of such an extensive change.) It must be confessed, however, that these various words are not so good as the corresponding con-
duction-current words.
But now, if, thirdly, we pass to electric displacement, the analogue of magnetic induction (noting by the way that it had better not be called the electric induction, on account of our already appropriating the word
induction, but be called the displacement), the existing terminology is extremely unsatisfactory; and, moreover, does not readily admit of adaptation and extension. Corresponding to conductivity and perme-
NOTES ON NOMENCLATURE.
25
ability we have "specific inductive capacity," or "dielectric constant,"
or whatever it may be called. I usually call it the electric capacity, or
the capacity. It refers to the unit volume. But here it is very unfor-
tunate that it is not this specific capacity c (say), but c/4?r, that is the
capacity of a unit cube condenser (such that charge = difference of
potential x capacity).
D,
the
displacement,
is
the
charge
+ or -
(
,
D E according to the end), and we have
= cE/4:7r,
being the electric
We D force.
may get over this trouble by putting it thus, = sE, and
calling s (or c/4?r) the specific capacity. Then the capacity in bulk is
got in the same manner as conductance from conductivity.
Supposing we have done this, there is still the trouble that capacity gives the extremely awkward inverse " incapacity," and the adjectives
"capacious" and "incapacious," besides not giving us any words for
use in bulk, like conductance and resistance. And, in addition, the
word capacity is itself rather objectionable, as likely to give beginners
entirely erroneous notions as to the physical quality involved. It is
not that one dielectric absorbs electricity more readily than another.
Electric displacement is an elastic phenomenon : one dielectric is more
yielding (electrically) than another. The reciprocal of s above is the
electric elasticity, measuring the electric force required to produce the
unit displacement. Thus s should have a name to express the idea of elastic yielding or distortion, and its reciprocal also a name (not strings
of words), and they should be readily adaptable, like conductivity, etc.
(Perhaps also a better word than permeability might be introduced,
although, as we see, it is tolerably accommodative.) Displacement
itself might also be replaced by another word less suggestive of bodily
translation; although, on the other hand, it harmonises well with
" current,"
the
displacement
being
the
accumulated
current,
or
the
current the time-variation of the displacement.
All these things will get right in time, perhaps. Ideas are of primary
importance, scientifically. Next, suitable language. As for the nota-
tion, it is an important enough matter, but still only takes the third
place.
NOTE 2. ON THE RISE AND PROGRESS OF NOMENCLATURE.
In the beginning was the word. The importance of nomenclature was recognised in the earliest times. One of the first duties that
devolved upon Adam on his installation as gardener and keeper of the
zoological collection was the naming of the beasts. The history of the race is repeated in that of the individual. This
grand modern generalisation explains in the most scientific manner the fondness for calling names displayed by little children.
Passing over the patriarchal period, the fall of the Tower of Babel and its important effects on nomenclature, the Egyptian sojourn, the
wanderings in the desert, the times of the Kings, of the Babylonian captivity, of the minor prophets, of early Christianity, of those dreadful
middle ages of monkish learning and ignorance, when evolution worked
backwards, and of the Elizabethan revival, and coming at once to the
middle of the 19th century, we find that Mrs. Gamp was much im-
26
ELECTRICAL PAPERS.
pressed by the importance of nomenclature. " Give it a name, I beg. Sairey, give it a name ! " cried that esteemed lady. She even went so
far as to give a name to an entirely fictitious personage Mrs. Harris, to wit who has many scientific representatives.
Having thus fortified ourselves by quoting both ancient and modern
instances, let us consider the names of the electrical units.
A really practical name should be short, preferably monosyllabic,
pronounced in nearly the same way by all civilised peoples, and not
mistakable for any other scientific unit. If, in addition, it be the name,
or a part of the name, of an eminent scientist, so much the better.
This is quite
a sentimental matter ;
but if it does no
harm, it is needless
to object to it. But we should never put the sentiment in the first
place, and give an unpractical name to a unit on account of the
sentiment.
Ohm and volt are admirable; farad is nearly as good (but surely it
was unpractical to make it a million times too big the present microfarad should be the farad) ; erg and dyne please me ; watt is not quite
so good, but is tolerable. But what about those remarkable results of
the Paris Congress, the ampere and the coulomb 1 Speaking entirely
for myself, they are very unpractical. Coulomb may be turned into
coul, and
is
then
endurable ;
this
unit
is,
however,
little
used.
But
ampere shortened to am or amp is not nice. Better make it pere ;
then it will do. Now an additional bit of sentiment comes in to support
us. Was not Ampere the father of electrodynamics ?
It seems rather unpractical for the B.A. Committee to have selected
108 c.g.s. as the practical unit of E.M.F., instead of 10 9. This will
hardly be appreciated except by those who make theoretical calculations;
the awkward thing is that the pere is one tenth of the c.g.s. unit of
current. I suppose it was because the present volt was an approxima-
tion to the E.M.F.
of a Daniell ;
that
is,
however,
a
very
strong
reason
for making the practical unit much smaller; because the E.M.F. of a
cell has now to be given in volts and tenths, or hundredths also. How
awkward it would have been if the ohm had been made 1010 c.g.s., so as to approximate to the resistance of a mile of iron telegraph wire. The ohm
and volt should be the same multiple of the c.g.s. units, both 10 9 for example. Then use the millivolt or centivolt when speaking of the
E.M.F. of cells. The present 1-12 volt would be 112 millivolts. Speaking from memory, Sir W. Thomson did object to the 10s volt at the
Paris Congress.
Mac, torn, bob, and dick are all good names for units. Tom and mac
(plural, max), have sentimental reasons for adoption ; bob and dick may
also at some future time. I have used torn myself (no offence, I hope) for six years past to denote 109 c.g.s. units of self or mutual electro-
magnetic induction coefficient. (Some reform is wanted here. Co-
efficient of self-induction, or of electromagnetic capacity, is too lengthy.)
K The advantage is that L toms divided by ohms gives L/E, seconds of
time.
But it is too big
a
unit
for
little
coils ;
then
use
the
millitom :
or even the microtom for very small coils. This applies to fine-wire coils. The c.g.s. unit itself would be most suitable for coils of a few
NOTES ON NOMENCLATURE.
27
turns of thick wire. If it is called the torn, then the kilotom or megatom will come in useful for fine-wire coils.
A name should certainly be given to a unit of this quantity, whether
it be torn, or mac, or any other practical name. Also, names to a unit
of magnetic force (intensity of), and of magnetic induction. There is also the question of the names, not of the units, but of the
physical magnitudes of which they are the units, but it is too large a
question to discuss here except in the most superficial manner. It is
engrained in the British nature to abbreviate, to make one word do for
We two or three, or a short for a long word. And quite right too.
have much
to be
thankful for ;
in the application of this general
remark,
consider what frightful names might have been given to the electrical
units by the Germans. But, on account of this national, and also
rational tendency to cut and clip, it is in the highest degree desirable
that as many as possible of the most important physical magnitudes
should be known, not by a long string of words, but by a single word,
or the smallest number possible.
Thus, I find myself frequently saying force, when I mean magnetic force, and even then, I mean the intensity of magnetic force. The context will generally make the meaning plain. But it is necessary to be very careful when there are more forces than one in question.
(This use of force as an abbreviation is, of course, quite distinct from
the frequent positive misuse of the word force, to indicate it may be
momentum, or energy, or activity, or, very often, nothing in particular,
the misuser not being able
to
say
exactly what
he
means ;
nor
does
it
much matter.) It would be decidedly better if such a quantity as
"intensity of magnetic force" had a one-word name, for people will
abbreviate, and sometimes confusion may step in. This remark applies
to most of the electromagnetic magnitudes.
There is an important magnitude termed the magnetic induction. I
call it often simply "the induction"; but in doing so, carefully avoid calling any other quantity " the induction " (sometimes the electric dis-
placement is called the electric induction). But there is an unfortunate
thing here, which somewhat militates against "the induction," or even " the magnetic induction " being a thoroughly good name for the magnitude in question. This is, that besides being a name of a physical magnitude, the word induction has a widespread use, in a rather vague manner, in connection with transient states in general, whether of the
electric or of the magnetic field, exemplified, to take an extreme
example, when a man explains something complex by saying it is
caused by "induction," and so settling the matter. If this vague qualitative use of induction were got rid of, then as a name for a
physical magnitude it would be unobjectionable. As it is, it is a
question whether the physical magnitude should not have a name for
itself alone.
" Resistivity"
for
specific
resistance,
and
"conductance"
for what
is
sometimes called the conductibility of a wire, i.e., not its conductivity
(specific conductance), but the reciprocal of its resistance, are, I think,
as I have remarked before, quite practical names.
28
ELECTRICAL PAPERS.
NOTE 3. THE INDUCTANCE OF A CIRCUIT.
IN my first note, amongst other things, I remarked that whilst the
conduction-current terminology admitted of the words resistivity and conductance being coined to make it more complete, the terminology in
the allied cases of magnetic induction and electric displacement was
unsatisfactory.
As regards the former, the following appears to me to be practical.
We First, abolish the word permeability, and substitute Inductivity.
B B then have = pH, when
is the Induction, and /x the Inductivity,
H showing how the Induction is related to the magnetic force by the
specific quality of the medium at the place, its inductivity.
Now conductivity and conductance are mathematically related in the
same manner (except as regards a 4?r) as inductivity and what it is
naturally suggested to call Inductance.
The Inductance of a circuit is what is now called its coefficient of
self-induction, or of electromagnetic capacity.
Thus the quantities induction, inductivity, and inductance are happily connected in a manner which is at once concise and does justice to their
real relationship. When the mutual coefficient of induction of two
circuits is to be referred to, it will of course be the mutual inductance.
XXXIII. NOTES ON THE SELF-INDUCTION OF WIRES.
[The Electrician, 1886 ; Note 1, April 23, p. 471 ; Note 2, May 7, p. 510.]
We NOTE 1.
read in the pages of history of a monarch who was
" supra grammaticam."
All truly great men are like that monarch.
They have their own grammars, syntaxes, and dictionaries. They
cannot be judged by ordinary standards, but require interpretation.
Fortunately the liberty of private interpretation is conserved.
No man has a more peculiar grammar than Prof. Hughes. Hence, he
is liable, in a most unusual degree, to be misunderstood, as I venture to
think he has been by many, including Mr. W. Smith, whose interesting
letter appears in The Electrician, April 16, 1886, p. 455, and Prof. H.
Weber, p. 451.
The very first step to the understanding of a writer is to find out what
he means. Before that is done there cannot possibly be a clear com-
prehension of his utterances. One may, by taking his language in its
ordinary significance, hastily conclude that he has either revolutionised
the science of induction, or that he is talking nonsense. But to do this
We would not be fair.
must not judge by what a man says if we have
good reason to know that what he means is quite different. To be quite
fair, we must conscientiously endeavour to translate his language and
ideas into those we are ourselves accustomed to use. Then, and then
only, shall we see what is to be seen.
When Prof. Hughes speaks of the resistance of a wire, he does not
NOTES ON THE SELF-INDUCTION OF WIRES.
29
always mean what common men, men of ohms, volts, and farads, mean by the resistance of a wire only sometimes. He does not exactly
define what it is to be when the accepted meaning is departed from.
But by a study of the context we may arrive at some notion of its new
meaning. It is not a definite quantity, and must be varied to suit
circumstances.
Again,
there
is
his
" inductive
"
capacity
of
a
wire.
We can only find roughly what that means by putting together this,
that, and the other. It, too, is not a definite quantity, but must be
varied to suit circumstances. It is not the coefficient of self-induction,
nor is it any quantity defining a specific quality of the wire, like conductivity, or inductivity. It is a complex quantity, depending on a
great many things, but which may, to a first rough approximation, be
taken to be proportional to the time-constant of the wire, the quotient of its coefficient of self-induction by its resistance. Bearing these two
things in mind, we shall be able to approximate to Prof. Hughes's
meaning.
Owing to the mention of discoveries, apparently of the most revolu-
tionary kind, I took great pains in translating Prof. Hughes's language
into my own, trying to imagine that I had made the same experiments
in the same manner (which could not have happened), and then asking what are their interpretations ? The discoveries I looked for vanished for the most part into thin air. They became well known facts when
put into common language. The satisfaction of getting verifications,
however, even in so roundabout and rough a manner, is some compen-
sation for the disappointment felt. I venture to think that Prof.
Hughes does not do himself justice in thus deceiving us, however unwittingly, and that possibly there has been also some misapprehension on his part as to what the laws of self-induction are generally supposed
to be.
I have failed to find any departure from the known laws of electro-
magnetism. In saying this, however, I should make a reservational
remark. There may be lying latent in Prof. Hughes's results dozens of
discoveries, but it is impossible to get at them. For consider what the
mere existence of ohms, volts, and farads means ? It means that, even
before they were made, the laws of induction in linear circuits were
known, and very precisely. To get, then, at new discoveries requires
very accurate comparison of experiment with theory, by methods which
enable us to see what we are doing and measuring, in terms of the
known electromagnetic quantities. This is practically impossible, on
We the basis of Prof. Hughes's papers.
can only make very rough
verifications. I have had myself, for many years past, occasional
experience with induction balances of an exact nature true balances
of resistance and induction and always found them work properly.
But, in the modification made by Prof. Hughes, the balance is generally
of a mixed nature, neither a true resistance nor a true induction balance,
and has to be set right by a foreign impressed force, viz., induction
between the battery and telephone branches. By using a strictly
simple harmonic E.M.F., as of a rotating coil, we may exactly formulate
the conditions of the false balance, and then, noting all the resistances,
30
ELECTRICAL PAPERS.
etc., concerned, derive, though in a complex manner, exact information.
Or, if we use true balances, any kind of E.M.F. will answer.
To illustrate the falsity of Prof. Hughes's balances and the difficulty
of getting at exact information, he finds the comparative force of the
extra-currents in two similar coils in series to be 1'74 times that of a
single coil.
From the
context it
would
appear
that
this
" comparative
force
of
the
"
extra-currents
is
the
same
thing
as
the
former
"
inductive
"
capacity
of wires.
Now, the coefficient of self-induction of two similar
coils in series, not too near one another, is double that of either, whilst
the time-constant of the two is the same as of either. This can be
easily verified by true balances.
The most interesting of the experiments are those relating to the
effect of increased diameter on what Prof. Hughes terms the "inductive
My "
capacity of wires.
own interpretation is roughly this. That the
time-constant of a wire first increases with the diameter, and then later
decreases rapidly ; and that the decrease sets in the sooner the higher
the conductivity and the higher the inductivity (or magnetic perme-
ability) of the wires. If this be correct, it is exactly what I should have
expected and predicted. In fact, I have already described the pheno-
menon substantially in
The
Electrician ;
or,
rather,
the
phenomenon
I
described contains in itself the above interpretation. In The Electrician
for January 10, 1885, I described how the current starts in a wire. It
begins on its boundary and is propagated inward. Thus, during the
rise of the current it is less strong at the centre than at the boundary.
As regards the manner of inward propagation, it takes place according
to the same laws as the propagation of magnetic force and current into
cores from an enveloping coil, which I have described in considerable
detail in The Electrician [Reprint, vol. 1, Art. 28. See especially 20].
The retardation depends on the conductivity, on the inductivity, and on
the section, under similar boundary conditions. If the conductivity be
high enough, or the inductivity or the section be large enough, to make
the central current appreciably less than the boundary current during
the greater part of the time of rise of the current, there will be an
apparent reduction in the time-constant. Go to an extreme case. Very
rapid short currents, and large retardation to inward transmission. Here we have the current in layers, strong on the boundary, weak in the middle. Clearly, then, if we wish to regard the wire as a mere linear circuit, which it is not, and as we can only do to a first approximation, we should remove the central part of the wire that is, increase
its resistance, regarded as a line, or reduce its time-constant. This will
happen the sooner the greater the inductivity and the conductivity, as
the section is continuously increased. It is only thin wires that can be
treated as mere lines, and even they, if the speed be only great enough,
must be treated as solid conductors. I ought also to mention that the
influence of external conductors, as of the return conductor, is of
importance, sometimes of very great importance, in modifying the distribution of current in the transient state. I have had for years in
MS. some solutions relating to round wires, and hope to publish them
soon.
NOTES ON THE SELF-INDUCTION OF WIRES.
31
As a general assistance to those who go by old methods a rising
current inducing an opposite current in itself and in parallel conductors
this may be useful. Parallel currents are said to attract or repel,
according as the currents are together or opposed. This is, however,
mechanical force on the conductors. The distribution of current is not
affected by it. But when currents are increasing or decreasing, there is
an apparent attraction or repulsion between them. Oppositely going
currents repel when they are decreasing, and attract when they are
increasing. Thus, send a current into a loop, one wire the return to the other, both being close together. During the rise of the current it will be denser on the sides of the wires nearest one another than on the
remote sides. It is an apparent force, not between currents (on the distance-action and real motion of electricity views), but between their
accelerations.
NOTE 2. I did not expect to return to the subject, and do so because
Prof. Hughes has apparently misunderstood my statements. On p. 495
of The Electrician for April 30, 1886, he says : "Mr. Oliver Heaviside
points out that upon a close examination it will be found that all the
effects which I have described are well known to mathematicians, and
A consequently old."
regard for accuracy compels me to point out that
I did not
make
the
statement
he
credits
me
with ;
nor,
to
avoid
any
hypercriticism, is the above a correct summary of the many things that
I pointed out.
I said, "The discoveries I looked for vanished, for the most part, into thin air. They became well-known facts when put into common
language." Observe here my "for the most part" as against Prof.
Hughes's
""
all ;
and that I said
not
a
word
about
mathematicians
in
the whole letter. An immediate consequence of my statement is
another, namely, that some, although a minority, of the results were
not well known. There is a material difference between what I said
and what Prof. Hughes makes me say. In another place I said that I had "failed to find any departure from the known laws of electro-
magnetism," and then proceeded to give my reasons for it. This
statement includes the well-known facts as well as those which are not
well known.
It may be as well that I should illustrate the difference between wellknown facts and those that are less known, or only known theoretically.
The influence of the form of a thin wire (a linear conductor), and of its length, diameter, conductivity, and inductivity on the phenomena of self-induction is well known. The various relations involved form the
A B C of the subject. So are the effects of concentration of the current,
and of dividing it, or spreading it out in strips, well known. There is
another influence that is well known, that is scarcely touched upon by Prof. Hughes. The self-induction depends upon the distribution of
inductivity, that is, in another form, of inductively magnetisable matter,
outside the current, as well as in it, in a manner which is quite definite when the magnetic properties of the matter are known.
It is not to be inferred that verifications of well-known facts are of no
32
ELECTRICAL PAPERS.
value that depends upon circumstances. To be of any use, we must know what we are measuring and verifying. The theory of self and
mutual induction in linear circuits is almost a branch of pure mathe-
matics, so simply are the quantities related, and so exactly. It furnishes
a most remarkable example of the dependence of complex phenomena on a very small number of independent variables, by ignoring minute
dielectric phenomena. In getting verifications, then, it is first necessary to employ a correct method. I have elsewhere [The Electrician, April 30, 1886, p. 489; the next Art. 33] shown the approximate character of Prof. Hughes's method of balancing, and pointed out exact methods. Next, it is necessary to put results in terms of the quantities in the electro-
magnetic theory which is founded upon the well-known facts; how else can we know what we are doing, and see how near our verifica-
tions go?
Coming now to results that are not well known, there is the thick-
wire effect, depending on size, conductivity, inductivity, place of return
my current, etc. This is, in
opinion, the really important part of Prof.
Hughes's researches, as it, in some respects, goes beyond what was
already experimentally known. Having been, so far as I know, the
first to correctly describe (The Electrician, Jan. 10, 1885, p. 180)
[Reprint, vol. I. pp. 439, 440] the way the current rises in a wire, viz., by diffusion from its boundary, and the consequent approximation, under certain circumstances, to mere surface conduction ; and believing
my Prof. Hughes's researches to furnish experimental verifications of views, it will be readily understood that I am specially interested in
this
effect ;
and
I
can (in
anticipation) return
thanks
to
Prof.
Hughes
for accurate measures of the same, expressed in an intelligible form, to
render a comparison with theory possible if it be practicable. I send
my with this a first instalment of
old core investigations applied to a
round wire with the current longitudinal. [Section 26 of "Electro-
magnetic Induction," later.] There are also intermediate matters where one can hardly be said to
be either making verifications, except roughly, or discoveries; for instance, the self-induction of an iron-wire coil. Theory indicates in the plainest manner that the self-induction coefficient will be a much smaller multiple of that of a similar copper-wire coil than if the wires were straightened. Magnetic circuits are now getting quite popularly
understood, by reason of the commercial importance of the dynamo. But there is really no practical way of carrying out the theory completely, as the mathematical difficulties are so great. Hence, actual measurements of the precise amounts in various cases of magnetic
circuits are of value, if they be accompanied by the data necessary for
comparisons.
There is, however, this little difficulty in the way when transient
currents are employed. Iron, by reason of its high iuductivity, is pre-
We eminently suited for showing the thick-wire effect.
may not,
therefore, be always measuring what we want, but something else.
USE OF THE BRIDGE AS AN INDUCTION BALANCE.
33
XXXIV. ON THE USE OF THE BRIDGE AS AN INDUCTION
BALANCE.
[The Electrician, April 30, 1886, p. 489.]
IN connection with a paper "On Electromagnets, etc.," that I wrote
about six years ago [Reprint, Art. xvii., vol. 1, p. 95], which paper dealt mainly with the question of the influence of the electromagnetic induction of the lines and instruments on the magnitude of the signalling currents, an influence which is of the greatest importance on short lines, and which (of the instruments) is, even on long lines, where electrostatic induction is prominent, of importance as a retarding factor, I
made a great many experiments on self-induction, amongst which were
measurements of the inductances of various telegraph instruments, with a view to ascertaining their practical values, and also the multiplying
powers of the iron cores. It was my intention to write a supplementary
paper giving the results and also further investigations; but, having got involved, in the course of the experiments, in the difficult subject of magnetic inductivity, it was postponed, and then dropped out of mind.
I used, first of all, the Bridge and condenser method described by Maxwell, with reversals, and a telephone for current indicator. This was to get results at once, or by simple calculations, in electromagnetic units. Next, I discarded the condenser, and used the simple Bridge, balancing coils against standard coils. Thirdly, I have used a differential telephone with the same object, in a similar manner. The two last are very sensitive methods, and the verifications of the theory of induction in linear conductors that I have made by them are numerous.
The whole of this journal would be required to give anything like a full investigation of the various ways of using the Bridge as an induction balance. I can, therefore, only touch lightly on the subject of exact balances, especially as I have to remark upon faulty methods, approximate balances, and absolutely false balances. Prof. Hughes's balance is sometimes fairly approximate, sometimes quite false.
Put a telephone in the branch 5, battery and
interrupter in 6. Then, r standing for resistance, I for inductance (coefficient of self-induction), and x for l/r, the time-constant of a branch, the conditions of a true and perfect balance, however the impressed force in 6 vary, are three
in number, namely,
Their interpretations are as follows : If the first condition is fulfilled
there will be no final current in 5 when a steady impressed force is put
in 6. This is the condition for a true resistance balance.
H.E.P. VOL. IT.
c
34
ELECTRICAL PAPERS.
If, in addition to this, the second condition be also satisfied, the
integral extra-current in 5 on making or breaking 6 is zero, besides the
steady current being zero. (1) and (2) together therefore give an
approximate induction balance with a true resistance balance.
If, in addition to (1) and (2), the third condition is satisfied, the
extra-current is zero at every moment during the transient state, and
the balance is exact, however the impressed force in 6 vary.
Practically, take
r 1
=
r&
and
J 1= =/ 2 ,
(4)
that is, let branches 1 and 2 be of equal resistance and inductance.
Then the second and third conditions become identical; and, to get perfect balances, we need only make
r =r
3
4,
and
= Z 8
Z4
(5)
This is the method I have generally used, reducing the three con-
ditions to two, whilst preserving exactness. It is also the simplest
method. The mutual induction, if smy, of 1 and 2, or of 3 and 4, does
not
influence
the
balance
when
this
ratio
of
equality,
= i\
r
2,
is
employed
(whether
= /
/
x
2
or
not).
So branches 1 and 2 may consist of two
similar wires wound together on the same bobbin to keep their temper-
atures equal.
The sensitiveness of the telephone has been greatly exaggerated.
Altogether apart from the question of referring the sensitiveness to the
human ear rather than to the telephone, it is certainly, under ordinary
circumstances, often unable to appreciate the differences of the second
order, which vanish when the third condition is satisfied. Thus (1)
and (2) satisfied, but with (3) unsatisfied, will give silence. Take, for
instance,
r l
=r%
and
r
3
=
r#
but
^
different
from
/ 2
and
/3
from
/ 4,
then
silence is given by
ft-y/r.-ft-y/r.j
(6)
that is, by making the differences of the inductances on the two sides
We of 5 proportional to the resistances.
can therefore get silence by
varying the inductance of any one or more of the four branches 1, 2, 3,
4, to suit equation (6). It is certain that we do get silence this way,
but it does not follow that silence is given by exactly satisfying (6), (and
(1) of course), because it is only a balance of integral extra-currents,
and other balances of this kind are certainly quite false sometimes.
To avoid any doubt, it is of course best to keep to the legitimate and
simpler previously-described method.
There are some other ways of using the Bridge as an induction
balance in an exact manner, but they are less practically useful than
theoretically interesting. Pass, therefore, to other approximate, and to
false balances. Suppose we start with a true balance, and then upset
it by increasing the inductance of the branch 4. It is clear that we
should never alter the already truly established resistance balance.
Now, besides by the exact ways, we can get approximate silence by
allowing mutual induction between 5 and any of the other five branches,
or between 6 and any of the other five branches, that is nine ways, not
USE OF THE BRIDGE AS AN INDUCTION BALANCE.
35
counting combinations. (Put test coils in 5 and 6 with long leading
wires, so that they may be carried about from one branch to another.)
These approximate balances are all of the integral extra-current only,
and therefore imperfect, however nearly there may be silence. But the
silences are of very different values.
I find, using h'ne-wire coils, that mutual induction between 6 and 4
or between 6 and 3 gives silence (to my ear) with the true resistance
balance, just like the approximate balance of equation (6) in which no mutual induction is allowed.
These are only two out of the nine ways. All the rest are bad. If
the difference in the inductance of 3 and 4 be small, there is very
nearly silence on using any of the other seven ways; but, the larger
this
difference
is
made,
the
louder becomes
the
" silence,"
and
sometimes
it is even a very loud noise, quite comparable with the original sound
that was to be destroyed, even when the combinations 6 and 4 or 6 and
3, and the formerly-mentioned method give a silence that can be felt,
with the true resistance balance.
It is certainly a rather remarkable thing that the one method out of these seven faulty ways which gave the very loudest sound was the 5 and 6 combination, which is Professor Hughes's method. I do not say
that it is always the worst, although it was markedly so in my experiments to test the trustworthiness of the method. And sometimes it is
quite fair. In fact, when the sound to be destroyed is itself weak, all the seven faulty methods are apparently alike, nearly true. But when we exaggerate the inequality of inductance between 3 and 4, whilst the
6 to 4 and 6 to 3 combinations keep good, the others get rapidly worse, and differences appear between them.
I found that by increasing the resistance of the branch whose inductance was the smaller, the sound was diminished greatly, i.e., in
the seven faulty methods. The coil of greater inductance had apparently the higher resistance. That is, with a false resistance balance we may approximate to silence. Such a balance is condemned for scientific
purposes.
Although mutual induction between 6 and 4 or 6 and 3 gave silence,
with true resistance balances, the experiments were not sufficiently
extended to prove their general trustworthiness. There is, however,
some reason to be given for their superiority. For, since the dis-
turbance in the telephone arises from the inequality of the momenta of
the currents in the branches 3 and 4, and of the electric impulses
arising in them when contact is broken in branch 6 (considering the
break only for simplicity), we go nearest to the root of the evil by
generating an additional impulse in 3 or 4 themselves from the battery
branch, of the right amount.
The following is an outline of the theory of these approximate
= balances.
Let r^r^
r r first
23
;
so that,
C standing for current, we have,
in the steady state,
...... (7)
The
momentum
of
the
current
in
branch
1
is
If^
that
in
2
is
1C 2 2,
and
36
ELECTRICAL PAPERS.
so on. Consider the break, and the integral extra-current that then
arises from / (7 . It is 11
1& + + + + + {^ -f
r
2
r
6
(rs
r4)/(rs
r4
r-
5 ) },
and
+ + + (r3
r4 )/(rs
r4
r
5
)
is
the fraction of this that goes through 5 ;
so
that the integral current in 5 due to ^Cj is
h G + * + + + + + + r i( *
r*)
r
{( i
?<
r
2)(' 3
?>4 )
?
?
'o( 'i
? 2
r
s
r
4> } >
or
(7^
-
{r3
+
r
4
+
r5
+
^r^},
by making use of equations (1) and (7).
Treat the others similarly. The total extra-current in 5 is
r&fa + -x + + x
+ - 2
x 3)
4-
{r3
r4
r
5
r3r.jrj,
............ (8)
without any mutual induction. So
*C| ~F WA == ^/O "l **^Q
gives approximate balance. This was mentioned before, and becomes an exact balance with makes and breaks when a ratio of equality is
taken.
Now let there be mutual induction between 6 and 4, 5 and 4, and 5
and
6,
the
mutual
inductances
being
Af 64 ,
etc.
Treating these similarly
to before, we shall find the total extra-current in 5 on the break taking
place to be
M fato
+
z 4
-
x 2
-
x s)
+
M Jlf (l
+
rjr3]
+
M(l + rjrj
M +
l
56
(l+r
B
/
r l
)(l+rJr2
}}C\^(rs
+
r^
+
r
5
+
r
3
rJrl
)
..........
(9)
The theory of the make leads to the same result that is, as regards
Mthe integral extra-current. Otherwise they are different. So, using 56 (Hughes's method) the zero integral current is when
r4 (x1
+
x4
-x 2
-x 3)
+
M,6 (l+r3 lr1 )(l+rJr3)
=
.......... (10)
Using
Jf 45
we
have
M Using 6i we have
}+rJr3 ) = Q................ (12)
Practically
employ
a
ratio
of equality
=
r^ r^
^i = ^>
'
branches 1 and 2 equal fixtures. Then these three equations become
= 0, .................... (10a)
^4-^3+ JfwO+ra/r^O, .................... (lla)
1,-1B + 2M,6 = ..................... (12a)
M Thus the 46 system has the simplest formula, as well as being M practically perfect. It is the same with 6y Either of these must
equal half the difference of the inductances of 3 and 4.
As (10a), or, more generally, (10) contains resistances, we cannot get
any definite results from Prof. Hughes's numbers without a knowledge
of the resistances concerned. Note, also, that (10) and (11) are faulty
balances ;
to
improve
them,
destroy
the
resistance
balance ;
of
course
then the formula will change, and is likely to .become very complex.
It will be understood that when I speak of false resistance balances
in this paper I do not in any way refer to the thick-wire phenomenon,
USE OF THE BRIDGE AS AN INDUCTION BALANCE.
37
my mentioned in
letter [p. 30], which, from its very nature, requires
the resistance balance to be upset, or be different from what it would
be if the wire were thin, but of the same real [i.e., steady] resistance. The resistance balance must be upset in a perfect arrangement. Nor
can there be a true balance got, but only an approximate one, unless
a similar thick wire be employed to produce balance.
What I refer to here is the upsetting of the true resistance balance
when there is no perceptible departure whatever from the linear theory. The two effects may be mixed.
To use the Bridge to speedily and accurately measure the inductance of "a coil, we should have a set of proper standard coils, of known
inductance and resistance, together with a coil of variable inductance,
i.e., two coils in sequence, one of which can be turned round, so as to
vary the inductance from a minimum to a maximum. (The scale of
this variable coil could be calibrated by (12a), first taking care that the
resistance balance did not require to be upset.) This set of coils, in or out of circuit according to plugs, to form say branch 3, the coil to be
measured to be in branch 4. Ratio of equality. Branches 1 and 2
equal. Of course inductionless, or practically inductionless resistances
are also required, to get and keep the resistance balance.
The only step to this I have made (this was some years ago) in my
experiments, was to have a number of little equal unit coils, and two or
three multiples ; and get exact balance by allowing induction between
two little ones, with no exact measurement of the fraction of a unit.
So long as we keep to coils we can swamp all the irregularities due
to leading wires, etc., or easily neutralise them, and therefore easily obtain considerable accuracy. With short wires, however, it is a
different matter. The inductance of a circuit is a definite quantity. So is the mutual inductance of two circuits. Also, when coils are
connected together, each forms so nearly a closed circuit that it can be
taken as such, so that we can add and subtract inductances, and localise
them definitely as "belonging to this or that part of a circuit. But this simplicity is, to a great extent, lost when we deal with short wires,
We unless they are bent round so as to make nearly closed circuits.
cannot fix the inductance of a straight wire, taken by itself. It has no meaning, strictly speaking. The return current has to be considered.
Balances can always be got, but as regards the interpretation, that will
depend upon the configuration of the apparatus. [See Section xxxviii. of " Electromagnetic Induction," later.]
Speaking with diffidence, having little experience with short wires, I should recommend 1 and 2 to be two equal wires, of any convenient
length, twisted together, joined at one end, of course slightly separated
at the other, where they join the telephone wires, also twisted. The exact arrangement of 3 and 4 will depend on circumstances. But
always use a long wire rather than a short one (experimental wire).
If this is in branch 4, let branch 3 consist of the standard coils (of
appropriate size), and adjust them, inserting if necessary, coils in series with 4 also. Of course I regard the matter from the point of view of
getting easily interpretable results.
38
ELECTRICAL PAPERS.
The exact balance (1), (2), (3) above is quite special. If the branches 1 and 3 consist of any combination of conductors and condensers, with induction in masses of metal allowed, and branches 2 and 4 consist of
an exactly equal combination, in every respect, there will never be any
current in 5 due to impressed force in 6. And, more generally, 2 + 4
may be only a copy of 1 + 3, on a reduced scale, so to speak.
M P.S. (April 27, 1886.) The great exactness with which, when a
ratio
of
equality
is
used,
the
1T 64
and
methods conform to the true
6S
M resistance balance, as above mentioned, together with the almost per-
sistent departure of the 65 (Hughes's) method from the true resistance
balance, led me to suspect that, as in the use of the simple Bridge
method, with no mutual induction, the three conditions of a true balance
M M M are reduced to two by a ratio of equality, the same thing happens in
the
and
64:
6B methods, but not in the
65. This I have verified.
In Hughes's system the three conditions are
............................... (13)
+y=o /1+ /2 +/3
............... ....(15)
Now = = take 1-^
1^
r
l
r 2>
= r 3
?4 ;
then the
second and
third
are
equivalent to
2M + - /4 13
+ = 56 (l r3 /rj 0,
2^/33 = 1 + ljly
The second of these is a special relation that must hold before the first is true. Hence the sound with a true resistance balance, and the
M necessity of a false balance to get rid of it.
But in the
method the conditions are
= 0, ............... (17)
(18)
= Take
= Z
1
x
2,
i\
r
2,
= i 3
r
4,
as
before,
and
now
the
second
and
third
conditions become identical, viz.,
agreeing with the previously obtained equation
M M Thus, whilst Hughes's method is inaccurate, sometimes greatly so,
we may employ the 64 and 63 methods without any hesitation, provided a ratio of equality be kept to. They will be as accurate as the
simple Bridge method, and the choice of the methods will be purely a matter of convenience.
I have verified experimentally that the Hughes system requires a false resistance balance when, instead of coils, short wires are used, the branch of greater inductance having apparently the greater resistance.
M I have also verified that this effect is mixed with the thick-wire effect,
which last is completely isolated by using the proper M method or the simple Bridge. Its magnitude can now be exactly measured, free
from the errors of a faulty method. That is, it can be estimated for
any particular speed of intermittences or reversals, for it is not a
constant effect. Balance a very thin against a very thick wire, so that
the effect occurs only on me side.
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 39
XXXV. ELECTROMAGNETIC INDUCTION AND ITS
PROPAGATION. (SECOND HALF.)
[The Electrician, 1886-7.
Section XXV., April 23,
1886,
p.
469 ;
XXVI., May
14, p. 8 (vol. 17) ; XXVII., June 11, p. 88; XXVIJL, June 25, p. 128; XXIX.,
July 23, p. 212; XXX., August 6, p. 252 ; XXXI., August 20, p. 296; XXXII.,
August 27, p. 316; XXXIII., November 12, p. 10 (vol. 18) ; XXXIV., December
24, 1886, p. 143; XXXV., January 14, 1887, p. 211; XXXVL, February 4,
p. 281 ; XXXVIL, March 11, p. 390; XXXVIIL, April 1, p. 457; XXXIXa.,
May 13, p. 5 (vol. 19); XXX1X6., May 27, p. 50; XL., June 3, p. 79; XLL,
June
17,
p.
124 ;
XLII., July
1,
p.
163 ;
XLIIL,
July
15,
p. 206 ;
XLIV., August
12, p. 295; XLV., August 26, p. 340; XLVL, October 7, p. 459; XLVII.,
December 30, 1887, p. 189 (vol. 20).]
SECTION XXV. SOME NOTES ON MAGNETISATION.
ALTHOUGH it is generally believed that magnetism is molecular, yet
it is well to bear in mind that all our knowledge of magnetism is
derived from experiments on masses, not on single molecules, or
We molecular structures.
may break up a magnet into the smallest
pieces, and find that they, too. are little magnets. Still, they are
not molecular magnets, but magnets of the same nature as the
original ; solid bodies showing magnetic properties, or intrinsic-
We ally magnetised.
are nearly as far away as ever from a mole-
cular magnet. To conclude that molecules are magnets because
dividing a magnet always produces fresh magnets, would clearly be
unsound reasoning. For it involves the assumption that a molecule
has the same magnetic property as a mass, i.e., a large collection of
molecules, having, by reason of their connection, properties not
possessed by the molecules separately. (Of course, I do not define
a molecule to be the smallest part of a substance that has all the
properties of the mass.) If we got down to a mass of iron so small
that it contained few molecules, and therefore certainly not possess-
ing all the properties of a larger mass, what security have we that
its magnetic property would not have begun to disappear, and that
their complete separation would not leave us without any magnetic field at all surrounding them of the kind we attribute to intrinsic
magnetisation. That there would be magnetic disturbances round
an isolated molecule in motion through a medium, and with its parts
in relative motion, it is difficult not to believe in view of the partial
co-ordination of radiation and electromagnetism made by Maxwell.
But it might be quite different from the magnetic field of a so-called
magnetic molecule that is, the field of any small magnet. This
evident magnetisation might be essentially conditioned by structure,
not of single molecules, but of a collection, together with relative
motions connected with the structure, this structure and relative
motions conditioning that peculiar state of the medium in which
they are immersed, which, when existent, implies intrinsic magnet-
isation of the collection of molecules, or the little mass. However
this be, two things are deserving of constant remembrance. First,
that the molecular theory of magnetism is a speculation which it is
40
ELECTRICAL PAPERS.
desirable to keep well separated from theoretical embodiments of
known facts, apart from hypothesis. And next, that as the act of
exposing a solid to magnetising influence is, it is scarcely to be
doubted, always accompanied by a changed structure, we should take into account and endeavour to utilise in theoretical reasoning on magnetism which is meant to contain the least amount of
hypothesis, the elastic properties of the body, speaking generally,
and without knowing the exact connection between them and the
magnetic property. Hooke's law, Ut tensio, sic vis, or strain is proportional to stress,
implies perfect elasticity, and is the first approximate law on which to found the theory of elasticity. But beyond that, we have im-
perfect elasticity, elastic fatigue, imperfect restitution, permanent
set.
When we expose an unmagnetised body to the action of a
magnetic field of unit inductivity, it either draws in the lines of induction, in which case it is a paramagnetic, is positively magnetised inductively, and its inductivity is greater than unity ; or it wards oft' induction, in which case it is a diamagnetic, is negatively magnetised
inductively, and its inductivity is less than unity; or, lastly, it may not alter the field at all, when it is not magnetised, and its induc-
tivity is unity.
Regarding, as I do, the force and the induction not the force and the induced magnetisation as the most significant quantities, it is clear that the language in which we describe these effects is somewhat imperfect, and decidedly misleading in so prominently directing attention to the induced magnetisation, especially in the case of no induced magnetisation, when the body is still subject to the magnetic
influence, and is as much the seat of magnetic stress and energy as
the surrounding medium. We may, by coining a new word pro-
visionally, put the matter thus. All bodies known, as well as the so-called vacuum, can be inductized. According to whether the inductization (which is the same as "the induction," in fact) is greater or less than in vacuum (the universal magnetic medium) for the same magnetic force (the other factor of the magnetic energy product), we have positive or negative induced magnetisation.
To the universal medium, which is the primary seat of the magnetic energy, we attribute properties implying the absence of dissipation of energy, or, on the elastic solid theory, perfect
elasticity. (Dissipation in space is scarcely within a measurable distance of measurement.) But that the ether, resembling an elastic solid in some of its properties, is one, is not material here. Inductization in it is of the elastic or quasi-elastic character, and there can
be no intrinsic magnetisation. Nor evidently can there be intrinsic magnetisation in gases, by reason of their mobility, nor in liquids, except of the most transient description. But when we come to
solids the case is different.
If we admit that the act of inductization produces a structural change in a body (this includes the case of no induced magnetisation),
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 41
and if, on removal of the inducing force, the structural change disappears, the body behaves like ether, so far, or has no inductive retentiveness. Here we see the advantage of speaking of inductive rather than of magnetic retentiveness. But if, by reason of im-
perfect elasticity, a portion of the changed structure remains, the body has inductive retentiveness, and has become an intrinsic magnet. As for the precise nature of the magnetic structure, that is an independent question. If we can do without assuming any
particular structure, as for instance, the Weber structure, which is
nothing more than an alignment of the axes of molecules, a structure
which I believe to be, if true at all, only a part of the magnetic
structure, so much the better. It is the danger of a too special hypothesis, that as, from its definiteness, we can follow up its consequences, if the latter are partially verified experimentally we
seem to prove its truth (as if there could be no other explanation), and so rest on the solid ground of nature. The next thing is to
predict unobserved or unobservable phenomena whose only reason
may be the hypothesis itself, one out of many which, within limits,
could explain the same phenomena, though, beyond those limits, of
widely diverging natures.
The retentiveness may be of the most unstable nature, as in soft
iron, a knock being sufficient to greatly upset the intrinsic magnetisa-
tion existing on first removing the magnetising force, and completely
alter
its
distribution
in
the
iron ;
or
of
a more or less permanent
character, as in steel. But, whether the body be para- or dia-
magnetic, or neutral, the residual or intrinsic magnetisation, if there
be any, must be always of the same character as the inducing force. That is, any solid, if it have retentiveness, is made into a magnet,
magnetised parallel to the inducing force, like iron.
Until lately only the magnetic metals were known to show reten-
tiveness. Though we should theoretically expect retentiveness in
all solids, the extraordinary feebleness of diamagnetic phenomena
might be expected to be sufficient to prevent its observation. But,
first, Dr. Tumlirz has shown that quartz is inductively retentive, and
next, Dr. Lodge (Nature, March 25th, 1886) has published some
results of his experiments on the retentiveness of a great many
other substances, following up an observation of his assistant, Mr.
Davies.
The mathematical statement of the connections between intrinsic
magnetisation and the state of the magnetic field is just the same whether the magnet be iron or copper, para- or dia-magnetic, or is icutral. In fact, it would equally serve for a water or a gas magnet,
rere they possible. That is,
divB =
being the magnetic force according to the equation B = /xH, where is the induction and //. the inductivity, F the electric current, if
y, and h. the magnetic force of the intrinsic magnetisation, or the
ipressed magnetic force, as I have usually called it in previous
-i2
ELECTRICAL PAPERS.
sections where it has occurred, because it enters into all equations as
an impressed force, distinct from the force of the field, whose rotation
measures the electric current. It is h and that are the two data //.
concerned
in
intrinsic
magnetisation
and
its
field ;
the quantity I,
the intensity of intrinsic magnetisation, only gives the product, viz.,
= I fjih/^TT. It would not be without some advantage to make h and
/A the objects of attention instead of I and /x, as it simplifies ideas as
well as the formulae. The induced magnetisation, an extremely
artificial
and
rather
unnecessary
quantity,
is
-
(/*
1)
(H
-
h)/4*r.
It will be understood that this system, when united with the
corresponding electric equations, so as to completely determine transient states, requires h to be given, whether constant or variable
with the time. The act of transition of elastic induction into
intrinsic magnetisation, when a body is exposed to a strong field, cannot be traced in any way by our equations. It is not formulated, and it would naturally be a matter of considerably difficulty to do it.
In a similar manner, we may expect all solid dielectrics to be
capable of being intrinsically electrized by electric force, as described in a previous section. I do not know, however, whether any dielectric has been found whose dielectric capacity is less than that of vacuum, or
whether such a body is, in the nature of things, possible. As everyone knows nowadays, the old-fashioned rigid magnet is a
myth. Only one datum was required, the intensity of magnetisation I,
assuming /x to be unity in as well as outside the magnet. It is a great pity, regarded from the point of view of mathematical theory, which is rendered far more difficult, that the inductivity of intrinsic magnets
is not unity. But we must take nature as we find her, and although Prof. Bottomley has lately experimented on some very unmagnetisable steel, which may approximate to /*= 1, yet it is perfectly easy to show
that the inductivity of steel magnets in general is not 1, but a large
number, though much less than the inductivity of soft iron, and we
may use a hard steel bar, whether magnetised intrinsically or not, as
the core of an electromagnet with nearly the same effects, as regards
induced magnetisation, except as regards the amount, as if it were
of soft iron.
Regarding the measure of inductivity, especially in soft iron, this is
really not an easy matter, when we pass beyond the feeble forces of telegraphy. For all practical purposes ^ is a constant when the magnetic force is small, and Poisson's assumption of a linear relation between the induced magnetisation and the magnetic force is abundantly verified. It is almost mathematically true. But go to larger forces,
and suppose for simplicity we have a closed solenoid with a soft iron core, and we magnetise it. Let F be the magnetic force of the current. Then, if the induction were completely elastic, we should have the
induction B = /*F. But in reality we have B = />t(F + h) = /xH. If we
assume the former of these equations, that is, take the magnetic force
of the current as the magnetic force, we shall obtain too large an
H estimate of the inductivity, in reckoning which should be taken as
the magnetic force. This may be several times as large as F. For, the
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 43
softer the iron the more imperfect is its inductive elasticity, and the
more
easily is
intrinsic
magnetisation
made
by large
forces ;
although
the retentiveness may be of a very infirm nature, yet whilst the force
F is on, there is h on also. This over-estimate of the inductivity may
be partially corrected by separately measuring h after the original
magnetising force has been removed, by then destroying h. But this
h may be considerably less than the former. For one reason, when we
take off F by stopping the coil-current, the molecular agitation of the
heat of the induced currents in the core, although they are in such a
direction as to keep up the induced magnetisation whilst they last,
is sufficient to partially destroy the intrinsic magnetisation, owing to
We the infirm retentiveness.
should take off F by small instalments,
or slowly and continuously, if we want h to be left.
Another quantity of some importance is the ratio of the increment in
the elastic induction to the increment in the magnetic force of the
current. This ratio is the same as /x when the magnetic force is small,
but is, of course, quite different when it is large.
As regards another connected matter, the possible existence of
magnetic friction, I have been examining the matter experimentally.
Although the results are not yet quite decisive, yet there does appear
to be something of the kind in steel. That is, during the act of in-
ductively magnetising steel by weak magnetic force, there is a reaction
on the magnetising current very closely resembling that arising from
eddy currents in the steel, but produced under circumstances which
would render the real eddy currents of quite insensible significance.
In soft iron, on the other hand, I have failed to observe the effect. It
has nothing to do with the intrinsic magnetisation, if any, of the steel. But as no hard and fast line can be drawn between one kind of iron
and another, it is likely, if there be such an effect in steel, where, by the way, we should naturally most expect to find it, that it would be, in a
smaller degree, also existent in soft iron. Its existence, however, will
not alter the fact materially that the dissipation of energy in iron when it is being weakly magnetised is to be wholly ascribed to the electric
currents induced in it.
P.S. (April 13, 1886.) As the last paragraph, owing to the hypothesis
involved in magnetic friction, may be somewhat obscure, I add this in
explanation. The law, long and generally accepted, that the induced
magnetisation is simply proportional to the magnetic force, when small,
is of such importance in the theory of electromagnetism, that I wished
to see whether it was minutely accurate. That is, that the curve of
magnetisation is, at the origin, a straight line inclined at a definite
angle to the axis of abscissae, along which magnetic force is reckoned.
I employed a differential arrangement (differential telephone) admitting
of being made, by proper means, of considerable sensitiveness. The law is easily verified roughly. When, however, we increase the sensi-
tiveness,
its
accuracy
becomes,
at
first
sight,
doubtful ;
and
besides,
differences appear between iron and steel, differences of kind, not of
mere magnitude. But as the sensitiveness to disturbing influences
44
ELECTRICAL PAPERS.
is also increased, it is necessary to carefully study and eliminate them. The principal disturbances are due to eddy currents, and to the variation in the resistance of the experimental coil with temperature. For instance, as regards the latter, the approach of the hand to the coil
may produce an effect larger than that under examination. The
general result is that the law is very closely true in iron and steel, it being doubtful whether there is any effect that can be really traced to a departure from the law, when rapidly intermittent currents are employed, and that the supposed difference between iron and steel is
unverified.
Of course it will be understood by scientific electricians that it is necessary, if we are to get results of scientific definiteness, to have true balances, both of resistance and of induction, and not to employ an arrangement giving neither one nor the other. He will also understand that, quite apart from the question of experimental ability, the theorist sometimes labours under great disadvantages from which the pure experimentalist is free. For whereas the latter may not be bound by theoretical requirements, and can employ himself in making discoveries, and can put down numbers, really standing for complex quantities, as representing the specific this or that, the former is hampered by his theoretical restrictions, and is employed, in the best part of his time, in the poor work of making mere verifications.
SECTION XXVI. THE TRANSIENT STATE IN A ROUND WIRE WITH A
CLOSE-FITTING TUBE FOR THE RETURN CURRENT.
The propagation of magnetic force and of electric current (a function
of the former) in conductors takes place according to the mathematical laws of diffusion, as of heat by conduction, allowing for the fact of the
electric quantities being vectors. This conclusion may perhaps be
considered very doubtful, as depending upon some hypothesis. Since, however, it is what we arrive at immediately by the application of the laws for linear conductors to infinitely small circuits (with a tacit
assumption to be presently mentioned), it seems to me more necessary
for an objector to show that the laws are not those of diffusion, rather
than for me to prove that they are.
We may pass continuously, without any break, from transient states
in linear circuits to those in masses of metal, by multiplying the number of, whilst diminishing the section of, the " linear " conductors
indefinitely, and packing them closely. Thus we may pass from linear
circuits to a hollow, core ; from ordinary linear differential equations to a partial differential equation ; from a set of constants, one for each
circuit, to a continuous function, viz., a compound of the J function
and its complementary function containing the logarithm. This I have worked out. Though very interesting mathematically, it would occupy some space, as it is rather lengthy. I therefore start from the partial
differential equation itself.
Our fundamental equations are, in the form I give to them,
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 45
H E and
being the electric and magnetic forces, C the conduction
current, k and p. the conductivity and the inductivity. The assumption
I referred to is that the conductor has no dielectric capacity. Bad
conductors have. We are concerned with good conductors, whose
dielectric capacity is quite unknown.
We are concerned with a special application, and therefore choose the
suitable coordinates. All equations referring to this matter will be
marked b. The investigations are almost identical with those given in
my paper on " The Induction of Currents in Cores," in The Electrician
for 1884. [Reprint, vol. I., p. 353, art. XXVIIL] The magnetic force
was then longitudinal,
the
current circular ;
now it is the current
that
is longitudinal, and the magnetic force circular.
The distribution of current in a wire in the transient state depends
materially upon the position of the return conductor, when it is near.
The nature of the transient state is also dependent thereon. Now, if
the return conductor be a wire, the distributions in the two wires are
rendered unsymmetrical, and are thereby made difficult of treatment.
We, therefore, distribute the return current equally all round the wire,
by employing a tube, with the wire along its axis. This makes the
distribution symmetrical, and renders a comparatively easy mathematical
analysis possible. At the same time we may take the tube near the
wire or far away, and so investigate the effect of proximity. The
present example is a comparatively elementary one, the tube being supposed to be close-fitting. As I entered into some detail on the method of obtaining the solutions in " Induction in Cores," I shall not
enter into much detail now. The application to round wires with the current longitudinal was made by me in The Electrician for Jan. 10, 1885,
p. 180, so far as a general description of the phenomenon is concerned.
my See also
letter of April 23, 1886. [Reprint, vol. I., p. 440; vol. IL,
p. 30.]
Let there be a wire of radius a, surrounded by a tube of outer radius
b, and thickness b a. In the steady state, if the current-density is F
in the wire, it is
-
Ta 2/(b 2
-
a2 )
in
the
tube,
if
both
be
of
uniform
con-
H ductivity, and the tube or sheath be the return conductor of the wire.
Let HI be the intensity of magnetic force in the wire, and
in the
2
tube. The direction of the magnetic force is circular about the axis in
We both, and the current is longitudinal.
shall have
H! = 2uTr,
H = 2
-
2*rIV(^
-
b
2
2 )/r(b'
-
a2 ),
(2b)
where r is the distance of the point considered from the axis. Test by
We the first of equations (15).
have
curl = i ir,
r dr
when applied to H.
Now let this steady current be left to itself, without impressed force
to keep it up, so that the " extra-current " phenomena set in, and the magnetic field subsides, the circuit being left closed. At the time t
later, if the current-density be 7 at distance r from the axis, it will be
represented by
AJ y = Z
(nr)<>*
()
46
ELECTRICAL PAPERS.
where 2 is the sign of summation. The actual current is the sum of an
infinite series of little current distributions of the type represented, in
which A, n, and p are constants, and JQ (nr) is the Fourier cylinder
We function.
have
-
r dr dr
...(45)
Let d/dt=p, a constant, then n is given in terms of p by
= ri2
- ^TTjjikp ............................... (5b)
We suppose that k and /x are the same in the wire as in the sheath.
Differences will be brought in in the subsequent investigation with the
sheath at any distance.
In (3b) there are two sets of constants, the A's fixing the size of the
normal systems, and the ris or p's, since these are connected by (5&).
To find the ris, we ignore dielectric displacement, since it is electro-
magnetic induction that is in question. This gives the condition
#= 2 0,
at
= r 6; ........................ (66)
i.e., no magnetic force outside the tube. This gives us
(U)
as the determinantal equation of the ris, which are therefore known by
__ _ inspection of a Table of values of the J^ function. Find the A's by the conjugate property. Thus,
-
-
A
=
rfV Jo
(r)rrfr
J[.YaV^arJnfr/^
a?)
=~
L J na i( )
o
The full solution is, therefore, 2aT
giving the current at time t anywhere. The equation of the magnetic force is obtained by applying the
second of equations (15) ; it is
. SiraT JmJnr4*
and the expression for the vector-potential of the current (for its scalar
A^ magnitude
that is to say, as its direction, parallel to the current,
does not vary, and need not be considered), is
This may be tested by
/xH; .............................. (126)
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 47
curl being now= -d/dr.
= In the steady state (initial),
0,
in the wire, and
^/ A -
2/ - V* + r* + 262 log\
(136)
in the sheath. Test by (126) applied to (136) to obtain (26). The magnetic energy being puBP/Qir per unit volume, the amount in
length / of wire and sheath is, by (106),
2d n*Jt(nb)
To verify, this should equal the space-integral of ^A y, using (116)
and (96). This need not be written. They are identical because
[j!(nr) rdr = {*J*(nr)rdr = J6V>6),
Jo
Jo
so that we may write the expression for T thus,
The
dissipativity
being
2
y /&
per
unit
volume,
the
total
heat
in
length
I
of wire
and
sheath
is,
= if p
k~ l ,
the
resistivity,
and
the
complete
variable period be included,
1
Q-PiWIV-W^ff** .......... <!>
When = t Q, either by (146) or by easy direct investigation, the
initial magnetic energy in length I is
giving the inductance of length I as
<""
which may be got in other ways. This refers to the steady state. In
the transient state there cannot be said to be a definite inductance, as
the distribution varies with the time. The expression in (156) for the total heat may be shown to be equivalent to that in (166) for the initial
magnetic energy, thus verifying the conservation of energy in our
system.
I should remark that it is the same formula (96) that gives us the current both in the wire and tube, and the same formula (106) that gives us the magnetic force. They are distributed continuously in the variable period. It is at the first moment only that they are discontinuous, requiring then separate formulae for the wire and tube, i.e., separate finite formulae, although only a single infinite series.
The first term of (96) is, of course, the most important, representing
48
ELECTRICAL PAPERS.
the normal system of slowest subsidence. In fact, there is an extremely rapid subsidence of the higher normal systems ; only three or four need
be
considered
to
obtain
almost
a
complete
curve ;
and,
at a compara-
tively early stage of the subsidence, the first normal system has become
far greater than the rest. In fact, on leaving the current without
impressed force, there is at first a rapid change in the distribution of
the current (and magnetic force), besides a rapid subsidence. It tends
to settle down to be represented by the first normal system ; a certain
nearly fixed distribution, subsiding according to the exponential law of
a linear circuit.
To see the nature of the rapid change, and of the first normal system,
refer to The Electrician of Aug. 23, 1884 [vol. L, p. 387], where is a
representation of the / and Jj curves. In Fig. 1, take the distance
OC.2 to be the outer radius of the tube, being on the axis. Then the
curve marked J^ is the curve of the magnetic force, showing its com-
w parative strength from the centre of the wire to the outside of the tube,
in the first normal system. And, to correspond, the curve
from
up
to
C 2
is
the
curve
of the
current,
showing
its
distribution
in
the
first
normal system.
We see that the position
of
the
point
J5 with :
respect
to
the
inner
radius of the sheath determines whether the current is transferred from
the wire to the sheath, or vice versa, in the early part of the subsidence.
If the sheath is very thin, so that the radius of the wire extends nearly
up
to
(7 2,
there
is
transfer
of
the
sheath -current
(initial)
from
the
sheath
a long way into the wire. On the other hand, if the wire be of small
radius compared with the outer radius of the tube, so that the tube's
depth
extends
from
C 2
nearly
up
to
0,
there
is
a
transfer
of the
original
wire-current a long way into the thick sheath. In Fig. 2 [vol. I., p. 388]
are shown the first four normal systems, all on the same scale as regards
the vertical ordinate, but we are not concerned with them at present.
Since
- v~ l
by (56), and -p~ l is the time-constant of subsidence of a normal system, we have, for the value of the time-constant of the first system,
because the value of the first nb, say n-^b, is 3-83. Compare this with
E the linear-theory time-constant L/B, where L is given by (\lb\ and
is the resistance of length / of the wire and sheath (sum of resistances,
as the current is oppositely directed in them). Let a = \b. Then
L = M28 id.
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 49
We have also
E= 1
2
Ql/3-n-kb' ,
therefore
L/R ='211 irfjjtf,
so that the time-constant of the first normal system is to that of the current in wire and tube on the linear theory as *27 to '21. But it is only after the first stage of the subsidence is over that this larger timeconstant is valid.
We may write the expression for L thus. Let x = b/a, then
(M r fda*
log X ,\
"rfTiiVS^r
nearly the same as 2/zZ log x when x is large. The minimum is when b = a; then L = ^l. This is the least value of the inductance of a round wire, viz., when it has a very thin and close-fitting sheath for the return
current, so that the magnetic energy is confined to the wire.
When b/a is only a little over unity,
_ 3fr2 - a* - 2ab
b*-a*'
+2
(b a)
We have also
R
=
WjvMl)?
-
a2 ),
and therefore
L/R - dfc^
Irrespective of b/a being only a little over unity, we have,
with a/b = ^,
= L/R
"009
2 (47r/*&& ),
55
>
10
55
TT
55
" -090
whilst the time-constant of the first normal system in all three cases is
068
2
(47r^6 ).
The maximum of L/R with b/a variable is when
x being b/a. This value of x is not much different from the ratio of the nodes in the first normal system, or the ratio of the value of nr making J^nr) = for the first time, to that making J (nr) = 0. For the latter value makes log# = -4'65, and makes the other side of the last equation
be -486.
In the subsidence from the steady state, the central part of the wire
is the last to get rid of its current. But the steady state has to be first
set up. Then it is the central part of the wire that is the last to get
its full current. To obtain the equations showing the rise of the current and of the magnetic force in the wire and the tube, we have to
reverse or negative the preceding solutions, and superpose the final
steady states. As these are discontinuous, there are two solutions, one
for the
wire,
the other for the
sheath ;
but the
transient
part
of
them,
which ultimately disappears, is the same in both. There is no occasion
to write these out.
If the steady state is not fully set up before the impressed force is
removed, we see that the central part of the wire is less useful as a con-
II. E. P. VOL. TT.
D
50
ELECTRICAL PAPERS.
ductor than the outer part, as the current is there the least. If there are short contacts, as sufficiently rapid reversals, or intermittences, the central part of the wire is practically inoperative, and might be removed, so far as conducting the current is concerned. Immediately after the impressed force is put on, there is set up a positive current on the outside of the wire, and a negative on the inside of the sheath, which are then propagated inward and outward respectively. If the sheath be thin, the initial (surface) wire-current is of greater and the initial sheath-current of less density than the values finally reached by keeping on the impressed force; whilst if it be the sheath that is thick the
reverse behaviour obtains.
This case of a close-fitting tube is rather an extreme example of departure from the linear theory ; the return current is as close as possible and wholly envelops the wire-current. Except as regards duration, the distributions of current and magnetic force are independent of the dimensions, i.e., in the smallest possible round wire closely surrounded by the return current the phenomena are the same as in a big wire similarly surrounded, except as regards the duration of the variable period. The retardation is proportional to the conductivity, to the inductivity, and to the square of the outer radius of the tube.
When, as in our next Section, we remove the tube to a distance, we
shall find great changes.
SECTION XXVII. THE VARIABLE PERIOD IN A EOUND WIRE WITH A CONCENTRIC, TUBE AT ANY DISTANCE FOR THE RETURN
CURRENT.
The case considered in the last Section was an extreme one of
departure from the linear theory. This arose, not from mere size,
but from the closeness of the return to the main conductor, and to
its completely enclosing it. Practically we must separate the two
conductors by a thickness of dielectric. The departure from the linear
theory is then less pronounced ; and when we widely separate the
conductors it tends to be confined to a small portion only of the
variable period. The size of the wire is then also of importance.
Let
there
be
a
straight
round
wire
of radius av
conductivity
k lt
and
inductivity /Zj, surrounded by a non-conducting dielectric of specific
capacity
c
and
inductivity
/x2
to
radius
a 2,
beyond
which
is
a
tube
of
conductivity ky and inductivity /*3, inner radius a.2 and outer 3. The
object of taking c into account, temporarily, will appear later.
Let the current be longitudinal and the magnetic force circular.
Then, by (1&), if y is the current-density at distance r from the axis,
we shall have
in the conductors, and in the dielectric respectively ; the latter form
being got by taking y = cj/47r, the rate of increase of the elastic
displacement.
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 51
A normal system of longitudinal current-density may therefore be
represented by
7j = -^j^o(wir)j
from r = to
yi = AJt(njr) + BsKt(nj),
r = a to l
7s = ^s^o(V) + #A(V)>
r * "2 to
in the wire, in the insulator, and in the sheath, respectively, at a given
moment. In subsiding, free from impressed force, each of these
expressions, when
multiplied
by
the
time-factor
t pt ,
gives
the
state
at
the time t later.
K /"(/) is the Fourier cylinder function, and Q (nr) the complementary
function. [For their expansions see vol. L, p. 387, equations (70) and (71)]. The ^4's and H's are constants, fixing the size of the normal
functions ;
the n's are constants showing the nature of the distributions,
and p determines the rapidity of the subsidence.
By applying (186) to (196) we find
n? =
-
lirnfap,
nl = - n#p\
- //,r
4*17*3^ :
...... (206)
expressing all the n's in terms of the p.
Corresponding to the expressions (196) for the current, we have the
following for the magnetic force :
J where, as is usual, the negative of the differential coefficient of Q(z)
K with respect to z is denoted by J^z) ; and, in addition, the negative of
the differential coefficient of Q(z) with respect to z is denoted by K^(z).
H These equations (216) are got by the second and third equations (16),
in the case of H^ and
H^ and in the case of
3;
by using, instead of
Ohm's law, the dielectric equation, giving
E in the dielectric,
being the electric force. Of course d/dt=p, in a
normal system.
We have next to find the relations between the five A's and ^'s, to
make the three solutions fit one another, or harmonize. This we must
do by means of the boundary conditions. These are nothing more than
the surface interpretations of the ordinary equations referring to space
distributions. In the present case the appropriate conditions are con-
tinuity of the magnetic and of the electric force at the boundaries,
because the two forces are tangential ; the conditions of continuity of
the normal components of the electric current and of magnetic induc-
tion are not applicable, because there are no normal components in question. If the magnetic or the electric force were discontinuous, we
H H should have electric or magnetic current-sheets.
?'
Thus =
.
2
HI and 2 are equal These give, by (216),
at
r=a lt
and
2 and H^ are equal at
52
ELECTRICAL PAPERS.
and
2
(4:Trn 2/n.2" cp
l (n^} ....... (236.
E E Similarly,
and
l
are equal at r = a v and E.2 and E* are equal at
a. 2
.
These give, by (196),
and
/ + =^ / % + K (47r/cp){^ 2 (n2a2 ) jB2JST ( 2fl2 )}
1
{^ 3 (
2)
s Q (i t 2 )}. (256)
^ ^ Thus, starting with
given, (225) and (245) give 2 and 7> in terms
A A A of v and then (236) and (256) give z and J53 in terms of Y
Similarly we might carry the system further, by putting more con-
centric tubes of conductors and dielectrics, or both, outside the first
tube, using similar expressions for the magnetic and electric forces; every fresh boundary giving us two boundary conditions of continuity to connect the solution in one tube with that in the next. But at
present we may stop at the first tube. Ignore the dielectric displace-
ment beyond it, i.e., put c =
beyond
= r
3 cf,
because
our
tube
is
to
We be the return conductor to the wire inside it.
may merely remark
in passing that although when such is the case, there is, in the steady
state, absolutely no magnetic force outside the tube, yet this is not
exactly true in a transient state. To make it true, take e = beyond
r=a 3;
requiring
-T 3
=
at r-a . s
This gives, by (216),
J = gJr1( 8os)+l?3Jri( 3a8)
...................... (266)
A A Now
%
and
J2
3
are,
by
the
previous,
known
in
terms
of
r
Make
A the substitution, and we find, first, that i is arbitrary, so that it,
when given, fixes the size of the whole normal system of electric and
magnetic force; and next, that the n'a are subject to the following
equation :
13213 13312 OV(
n 2
a
2
~
/ _
n 1 (
a\
2 2/
where, on the left side, to save trouble, the dots represent the same
fraction that appears in the numerator immediately over them.
Now, the w's are known in terms of p, hence (276) is the deter-
minantal equation of the j?'s, determining the rates of subsidence of
We all the possible normal systems.
have, therefore, all the informa-
tion required in order to solve the problem of finding how any initially
given state of circular magnetic force and longitudinal electric force in
We the wire, insulator, and sheath subsides when left to itself.
merely
require to decompose the initial states into normal systems of the above
types, and then multiply each term by its proper time-factor tpt to let
it subside at its proper rate. To effect the decomposition, make use of
the universal conjugate property of the equality of the mutual potential
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 53
U and the mutual kinetic energy of two complete normal systems, 12 = Tu
We [vol. I., p. 523], which results from the equation of activity.
start
with a given amount of electric energy in the dielectric, and of magnetic
energy in the wire, dielectric and sheath, which are finally used up in
heating the wire and sheath, according to Joule's law.
It would be useless to write out the expressions, for I have no
intention of discussing them in the above general form, especially as
regards the influence of c. Knowing from experience in other similar
cases that I have examined, that the effect of the dielectric displace-
ment on the wire and sheath phenomena is very minute, we may put
We c = at once between the wire and the sheath.
might have done
this at the beginning; but it happens that although the results are more complex, yet the reasoning is simpler, by taking c into account.
The question may be asked, how set up a state of purely longitudinal electric force in the tube, sheath, and intermediate dielectric? As
regards the wire and sheath, it is simple enough ; a steady impressed
force in any part of the circuit will do it (acting equally over a complete section). But it is not so easy as regards the dielectric. It requires
the impressed force to be so distributed in the conductors as to support the current on the spot without causing difference of potential. There will then be no dielectric displacement either (unless there be impressed
force in the dielectric to cause it). Now, if we remove the impressed
force in the conductors, the subsequent electric force will be purely
longitudinal in the dielectric as well as in the conductors.
But practical^ we do not set up currents in this way, but by means
of localised impressed forces. Then, although the steady state is one of longitudinal electric force in the wire and sheath, in the dielectric there
is normal or outward electric force as well as tangential or longitudinal, and the normal component is, in general, far greater than the tangential. In fact, the electrostatic retardation depends upon the normal displacement. But electrostatic retardation, which is of such immense import-
ance on long lines, is quite insignificant in comparison with electromagnetic on short lines, and in ordinary laboratory experiments with
We closed circuits (no condensers allowed) is usually quite insensible.
see, therefore, that when we put = c 0, and have purely longitudinal electric force, we get the proper solutions suitable for such cases where
the influence of electrostatic charge is negligible, irrespective of the
distribution of the original impressed force. Our use of the longitudinal displacement in the dielectric, then, was merely to establish a connection in time between the wire and the sheath, and to simplify the
conditions.
(In passing, I may give a little bit of another investigation. Take
both electric and magnetic induction into consideration in this wire and sheath problem, treating them as solids in which the current distribution varies with the time. The magnetic force is circular, so is fully specified
by its intensity, say H, at distance r from the axis. Its equation is, if
z be measured along the axis,
54
ELECTRICAL PAPERS.
in which discard the last term when the wire or sheath is in question ;
H or retain it and discard the previous when the dielectric is considered.
The form of the normal solution is
H= B Ji(sr)(A sin + cos)mz e*',
m = + for the wire, where s2
-
(iirfdsp
2 ).
The current has a longitudinal
and a radial component, say T and y, given by
F=
L + sJ (sr) (A sin
cos)mz
e pt ,
y= mJ^sr^A cos - B sm)mz *".
K In the dielectric and sheath the Q and K-^ functions have, of course,
to be counted with the 7 and Jr )
We Now put c = in (27 b).
shall have
J = Q (n2r)
1 ;
- %7i(v) = ;
K = Q (n2r) log (n.2r) ;
- n./K^r) = 1 ;
which
will
bring
:
( 27b)
down
to
the determinantal equation in the case of ignored dielectric displace-
ment.
To obtain this directly, establish a rigid connection between the
magnetic
and
electric
forces
at
r = a^
and
at
r=a 2,
thus.
Since there is
no current in the insulating space, the magnetic force varies inversely
as the distance from the axis of the wire. Therefore, instead of the
second of (216), we shall have
#2 =
-
(
n
i/^Ap)^i
J i(
n
i
a
i)(
a
i/
r\
H H by the first of (216). Thus
2
at
r=a 2
is
known,
and,
equated to
3
A A B at
r=a 2,
gives
us
one
equation
between
lt
and
3,
3.
Next we have
H^ meaning, temporarily, the value of H^ at r = ar This, when
multiplied by /*2, is the amount of induction through a rectangular
portion of a plane through the axis, bounded by straight lines of unit
length parallel to the axis at distances a-^ and r from it; or the line-
integral of the vector-potential round the rectangle ; or the excess of the
vector-potential
at
distance
r
over
that
at
distance
a x;
so, when
multiplied by p, it is the excess of the electric force at a^ over that
at r. Thus the electric force is known in the insulating space in terms
E of that at the boundary of the wire.
Its
value
at
r=a 2
equated
to
5
A B at r
a 2
gives
us
a
second
equation
between
lt A%, and
.
z
The third
is equation (266) over again, and the union of the three gives us (286)
again.
We now have, if y1 and y3 are the actual current-densities at time t in
the wire and the sheath respectively,
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 55
where
.
in which only the ^4 requires to be found, so that when = t Q, the initial state may be expressed. The decomposition of the initial state into normal systems may be effected by the conjugate property of the
vanishing of the mutual kinetic energy, or of the mutual dissipativity of a pair of normal systems. Thus, in the latter case, writing (296)
thus, y = ^Au, = 2^r, we shall have
;
+ u1tf^tfr/&1
p<.
Iv
fa,
J <2
We K ^ Wj,
-fr'j,
and
u 2,
v
2
being
a
pair
of normal
solutions.
can only get rid of those disagreeable customers, the
and
functions, by taking the sheath so thin that it can be regarded as a
linear conductor i.e., neglect variations of current-density in it, and
consider instead the integral current. (Except when the sheath and
wire are in contact and of the same material, as in the last section.)
Let
a
4
be
the
very
small
thickness
of
the
sheath,
and
evaluate
(286)
on
the
supposition
that
a
4
is
infinitely small, so
that a 2
and a s
are
equal
ultimately. The result is
/oKi) =
i^iK
a
i)((
?h/x
x 2//
i)
lo
aa -
( 2/ i)
the determinantal equation in the case of a round wire of radius c^ with a return conductor in the form of a very thin concentric sheath, radius a.2. Notice that /*3, the inductivity of the sheath itself, has gone out altogether ; that is, an iron sheath for the return, if it be thin enough, does not alter the retardation as compared with a copper sheath,
provided the difference of conductivity be allowed for.
We may get (306) directly, easily enough, by considering that the
total sheath-current must be the negative of the total wire-current, which last is, by integrating the first of (296) throughout the wire,
27 = (^/n1)2ro1
a 1(n1 1 ) t pt .
This, divided by the volume of the sheath per unit length, that is,
by 27r 2r/4, gives us the sheath current-density, and this, again, divided
= by
& 3
gives
us
the
electric
force
at
r
a. 2
Another expression for the
electric force at the sheath is given by the previous method (the
rectangle business). Equate them, and (306) results.
We have now got the heavy work over, and some results of special
cases will follow, in which we shall be materially assisted by the analogy
of the eddy currents in long cores inserted in long solenoidal coils.
SECTION XXVIII. SOME SPECIAL RESULTS RELATING TO THE RISE OF THE CURRENT IN A WIRE.
Premising
that
the wire
is
of
radius a lt
conductivity kv
inductivity
f4 ; that the dielectric displacement outside is ignored ; and that the
sheath for the return current is at distance
and is so thin that
2,
56
ELECTRICAL PAPERS.
variations of current-density in it may be ignored, so that merely the
total return current need be considered ;
that
a4
is
the
small
thickness
of the
sheath,
and
k
3
its
conductivity,
we
have
the
determinantal
equa-
tion (306). Let now
L = Q 2/x2 log(fl2/i),
A ViT =
1
(
,
-#2
=
O^/'A)"
1
-
L Q
is
the
external
inductance
per
unit
length,
i.e.,
the
inductance
per
R unit length of surface-ciiTTent, ignoring the internal magnetic field.
l
and
E. 2
are
the
resistances
per
unit
length
of
the
wire
and
sheath
|^ respectively, and
is the internal inductance per unit length, i.e., the
inductance per unit length of uniformly distributed wire-current when
the return current is on its surface, thus cancelling the external
We magnetic field.
can now write (306) thus :
and, in this, we have =
4vpikjpOi
4&l*i/Ri,
...(326)
From (316) we see that the two important quantities are the ratio of
the external to the internal inductance, and the ratio of the external to
LJ^ the internal resistance, i.e., the ratios
and R^jR^.
Suppose, first, the return has no resistance. Draw the curves
=
yi Jo(z)/Ji(x)
and
*/2 = KA)//*iK
<
the ordinates y, abscissae x, which stands for n^. Their intersections
show the required values of x. The JJJl curve is something like the
LJ^ curve of cotangent. If
is large, the first intersection occurs with
J a small value of x, so small that (x) is very little less than unity, so
that a uniform distribution of current is nearly represented by the first normal distribution, whose time-constant is a little greater than that of
the linear theory.
J^x) = 0. On the
The remaining intersections will be nearly given by other hand, decreasing LQ/^ increases the value of
= the first x ;
in the limit
it will be the
first
root
of J^x)
0.
Thus, if
the wire be of copper, and the return distant (compared with radius of
wire), the linear theory is approximated to. If of iron, on the other
hand, it is not practicable to have the return sufficiently distant, on
account of the large value of /x15 unless the wire be exceedingly fine.
Even if of copper, bringing the return closer has the same effect of
rendering the first normal system widely different from representing a uniform distribution of current. It is the external magnetic field that
gives stability, and reduces differences of current-density.
Next, let the return have resistance. The curve y2 must now be
The effect of increasing R.2 from zero is the opposite of that of increas-
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 57
ing LQ. It increases the first x, and tends to increase it up to that given
by J^x) = (not counting the zero root of this equation). Thus there
is a double effect produced. Whilst on the one hand the rapidity of
subsidence is increased by the resistance of the sheath, on the other the
wire-current in subsiding is made to depart more from the uniform distribution of the linear theory. The physical explanation is, that as
the external field in the case of sheath of no resistance cannot dissipate
its energy in the sheath it must go to the wire. But when the sheath
has great resistance the external field is killed by it ; then the internal
J field is self-contained, or the wire-current subsides as if
=
l (x) Q,
with
a
wide departure from uniform distribution. This must be marked when
the wire-circuit is suddenly interrupted, making the return-resistance
infinite.
Now, let there be no current at the time
= 0,
when,
put
on,
and
keep on, a steady impressed force, of such strength that the final
current-density in the wire is F . At time t the current-density F at
distance r from the axis is given by
__
i,t
l\
^n a ll
'
I
-
Kjptf +
{/
(Vi)AA(Vi) } 2
where the n^'a are the roots of equation (316). And the total current
in
the wire,
say
C l}
and with
it
the
equal
and
opposite
sheath-current,
will rise thus to the final value G' ,
^ C
4
(1
It will give remarkably different results according as we take the resistance of the wire very small and that of the sheath great, or conversely, or as we vary the ratio LJfj^. Infinite conductivity shuts out the current from the wire altogether, and so does infinite inductivity; the retardation to the inward transmission of the current being proportional to the product fij^af. Similarly, if the sheath has no resistance, the return current is shut out from it. In either of these shuttingout cases the current becomes a mere surface-current, what it always is in the initial stage, or when we cannot get beyond the initial stage, by reason of rapidly reversing the impressed force, when the current will
be oppositely directed in concentric layers, decreasing in strength with
great rapidity as we pass inward from the boundary. But if both the sheath and the wire have no resistance, there will be no current at all,
except the dielectric current, which is here ignored, and the two
surface-currents.
The way the current rises in the wire, at its boundary, and at its centre, is illustrated in " Induction in Cores." For the characteristic
equation of the longitudinal magnetic force in a core placed within a long solenoid, and that of the longitudinal current in our present case,
are identical. The boundary equations are also identical. That is,
(316) is the boundary equation of the magnetic force in the core, except-
B ing that the constants LQ/^ and 2/E1 have entirely different meanings,
depending upon the number of turns of wire in the coil, and its
58
ELECTRICAL PAPERS.
dimensions, and resistance. If, then, we adjust the constants to be
equal in both cases, it follows that when any varying impressed force
acts in the circuit of the wire and sheath, the current in the wire will
be made to vary in identically the same manner as the magnetic force
in the core, at a corresponding distance from the axis, when a similarly
varying impressed force acts in the coil-circuit (which, however, must
have only resistance in circuit with it. not external self-induction as
well). Thus, we can translate our core-solutions into round-straight-
wire solutions, and save the trouble of independent investigation, in
case a detailed solution has been already arrived at in either case.
Refer to Fig. 3 [p. 398, vol. I., here reproduced]. It represents the
curves of subsidence from the steady state. The "arrival" curves are
got by perversion and inversion, i.e., turn the figure upside down and
look at it from behind. The case we now refer to is when the sheath
has negligible
resistance,
and
when
we
take
the
constant
Z= 2/>i1 ,
which requires a near return when the wire is of copper, but a very
distant one if it is iron.
6
-8
1-0
1-2
1-4
Regarding them as arrival-curves, the curve h-Ji^ is the linear-theory curve, showing how the current-density would rise in all parts of the wire if it followed the ordinarily assumed law (so nearly true in common
H H fine-wire coils). The curve a a shows what it really becomes, at the boundary, and near to it. The current rises much more rapidly there in the first part of the variable period, and much more slowly in the later part. From this we may conclude that, when very rapid reversals are sent, the
amplitude of the boundary current-density will be far greater than
according to the linear theory ; whereas if they be made much slower it may become weaker. This is also verified by the separate calculation
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 59
in " Induction in Cores " of the reaction on the coil-current of the core-
currents when the impressed force is simple-harmonic, the amplitude of the coil-current being lowered at a low frequency, and greatly increased
at high frequencies [p. 370, vol. I.].
The curve ff ff shows how the current rises at the axis of the wire.
It is very far more slowly than at the boundary. But the important characteristic is the preliminary retardation. For an appreciable interval of time, whilst the boundary-current has reached a considerable
fraction of its final strength, the central current is infinitesimal. In fact
the
theory is similar
to
that
of
the submarine cable ;
when
a battery is
put on at one end, there is only infinitesimal current at the far end for
a certain time, after which comes a rapid rise.
H H H H Between the axis and the boundary the curves are intermediate
between a a at the boundary and
at the axis, there being pre-
liminary retardation in all, which is zero at the boundary, a maximum
at the axis. It is easy to understand, from the existence of this practi-
cally dead period, how infinitesimally small the axial current can be,
compared with the boundary current, when very rapid reversals are
sent. The formulae will follow.
The fourth curve liJiQ shows the way the current rises at the axis
when the return has no resistance, but when at the same time there is
LJ^ no external magnetic field, or
0. The return must fit closely
We over the wire.
may approximate to this by using an iron wire and
a close-fitting copper sheath of much lower resistance. There is pre-
liminary retardation, after which the current rises far more rapidly
Z than when //x1 is finite.
LJ^ That is, the effect of changing
from the value 2 to the value
H H is to change the axial arrival-curve from
to h h . Suppose it is a
copper wire. Then L = 2 means Iog(a2/a1 ) = 1, or a2/a^ = 2-718. Thus,
removing the sheath from contact to a distance equal to 2-7 times the
radius
of
the
wire
alters
the
axial
arrival-curve
from
hh Q
to
H^H^
Now this great alteration does not signify an increased departure from
the linear theory (equal current-density over all the wire). It is
We exactly the reverse.
have increased the magnetic energy by adding
the external field, and, therefore, make the current rise more slowly.
But the shape of the curve H^H^ if the horizontal (time) scale be suit-
ably altered, will approximate more closely to the linear-theory curve
h-Ji^ By taking the sheath further and further away, continuously increasing the slowness of rise of the current, we (altering the scale)
approximate as nearly as we please to the linear-theory curve, and
gradually wipe out the preliminary axial retardation, and make the
current rise nearly uniformly all over the section of the wire, except at
the first moment. In fact, we have to distinguish between the absolute
and the relative. When the sheath is most distant the current rises
the most slowly, but also the most regularly. On the other hand, when
the sheath is nearest, and the current rises most rapidly, it does so with the greatest possible departure from uniformity of distribution.
^ If the wire is of iron, say = 200, the distance to which the sheath
would have to be moved would be impracticably great, so that, except
GO
ELECTRICAL PAPERS.
in an iron wire of very low inductivity, or of exceedingly small radius,
we cannot get the current to rise according to the linear theory.
We The simple-harmonic solutions I must leave to another Section.
may, however, here notice the water-pipe analogy [p. 384, vol. i.]. The current starts in the wire in the same manner as water starts into
motion in a pipe, when it is acted upon hy a longitudinal dragging force
applied to its boundary. Let the water be at rest in the first place. Then, by applying tangential force of uniform amount per unit area of
the boundary we drag the outermost layer into motion instantly ; it, by the internal friction, sets the next layer moving, and so on, up to the centre. The final state will be one of steady motion resisted by surface friction, and kept up by surface force.
The analogy is useful in two ways. First, because any one can form an idea of this communication of motion into the mass of water from its
boundary, as it takes place so slowly, and is an everyday fact in one
form or another ;
also,
it enables us
to
readily perceive
the
manner
of
propagation of waves of current into wires when a rapidly varying im-
pressed force acts in the circuit, and the rapid decrease in the amplitude
of these waves from the boundary inward.
Next, it is useful in illustrating how radically wrong the analogy
really is which compares the electric current in a wire to the current of
water in a pipe, and impressed E.M.F. to bodily acting impressed force
on the water. For we have to apply the force to the boundary of the
water, not to the water itself in mass, to make it start into motion so
that its velocity can be compared with the electric current-density. The inertia, in the electromagnetic case, is that of the magnetic field,
not of the electricity, which, the more it is searched for, the more unsubstantial it becomes. It may perhaps be abolished altogether when we have a really good mechanical theory to work with, of a sufficiently simple nature to be generally understood and appreciated.
In our fundamental equations of motion
curl (e - E) = /xH,
curl H =
suppose we have, in the first place, no electric or magnetic energy, so
that E = 0, H = 0, everywhere, and then suddenly start an impressed
force e. The initial state is
E = 0,
H = 0,
Thus the first effect of e is to set up, not electric current (for that
requires there to be magnetic force), but magnetic current, or the rate of increase of the magnetic induction, and this is done, not by e, but by its rotation, and at the places of its rotation. [A general demonstration will be given later that disturbances due to impressed e or h always have curl e and curl h for sources.]
Now, imagine e to be uniformly distributed throughout a wire. Its rotation is zero, except on the boundary, where it is numerically e, directed perpendicularly to the axis of the wire. Thus the first effect is magnetic current on the boundary of the wire, and this is propagated inward and outward through the conductor and the dielectric respec-
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 61
lively. Magnetic current, of course, leads to magnetic induction and
electric current.
Now, in purely electromagnetic investigations relating to wires, in which we ignore dielectric displacement, we may, for purposes of calculation, transfer our impressed forces from wherever they may be in the circuit to any other part of the circuit, or distribute them uniformly, so as to get rid of difference of potential, which is much the best plan. It is well, however, to remember that this is only a device, similar in reason and in effect to the devices employed in the statics and dynamics of supposed rigid bodies, shifting applied forces from their points of application to other points, completely ignoring how forces are really transmitted. The effect of an impressed force in one part of the circuit is assumed to be the same as if it were spread all round the circuit. It would be identically the same were there no dielectric displacement, but only the magnetic force in question. When, however, we enlarge the field of view, and allow the dielectric displacement, it is
not permissible to shift the impressed forces in the above manner, for
every special arrangement has its own special distribution of electric energy. The transfer of energy is, of course, always from the source, wherever it may be. The first effect of starting a current in a wire is the dielectric disturbance, directed in space by the wire, because it is a sink of energy where it can be dissipated. But the dielectric disturbance travels with such great speed that we may, unless the line is long, regard it as affecting the wire at a given moment equally in every part of its length ; and this is substantially what we do when we ignore
dielectric displacement in our electromagnetic investigations, distribute
the impressed force as we please, and regard a long wire in which a current is being set up from outside as similar to a long core in a magnetising helix, when we ignore any difference in action at different
distances along the core.
SECTION XXIX. OSCILLATORY IMPRESSED FORCE AT ONE END OF A LINE. ITS EFFECT. APPLICATION TO LONG-DISTANCE TELEPHONY AND TELEGRAPHY.
Given that there is an oscillatory impressed force in a circuit, if this question be asked what is the effect produced 1 the answer will vary greatly according to the conditions assumed to prevail. I therefore make the conditions very comprehensive, taking into account frictional resistance, forces of inertia, forces of elasticity, and also the approxima-
tion to surface conduction that the great frequency of telephonic currents makes of importance.
Space does not permit a detailed proof from beginning to end. The results may, however, be tested for accuracy by their satisfying all the conditions laid down, most of which I have given in the last three
Sections.
The electrical system consists
of
a
round wire
of
radius
a lt
conduc-
^ tivity kv and inductivity ; surrounded by an insulator of inductivity
62
ELECTRICAL PAPERS.
/x2 and specific dielectric capacity c, to radius a.2 ; surrounded by the return of conductivity ky inoluctivity /*3, and outer radius ay The wire and return to be each of length I, and to be joined at the ends to make
a closed conductive circuit.
Let
S
be
the
electrostatic
capacity,
and
L Q
the
inductance
of the
dielectric per unit length of the line. That is,
L Q
=
2^log(a.2/al \
S = c{2 .og^A)}" 1......... (335)
We L have
= S = Cfj, 2
v~'2
:,
if
v
is
the
speed
of
undissipated
waves through
the dielectric.
V Let be the surface-potential of the wire, and C the wire-current, or
total current in the wire, at distance x from one end, at time /. The
differential equation of F'is
where R' and 1J are certain even functions of p, whose structure will
be explained later, and p stands for d/dt. That of C is the same. The connection between G and V is given by
........................... (356)
Both (346) and (356) assume that there is no impressed force at the place considered. If there be impressed force e per unit length, add e to the left side of (356), and make the necessary change in (346), which
is connected with (356) through the equation of continuity
.
ax
...(366)
But as we shall only have e at one end of the line, we shall not
require to consider e elsewhere.
Now, given (346) and (356), and that there is an impressed force
R F sin nt at the x = end, find V and C everywhere. Owing to f and
Lf containing only even powers of p, and to the property p2 = - n2 possessed by p in simple-harmonic arrangements, Rf and Lf become
constants. The solution is therefore got readily enough. Let
U
Q - (4^)1 { (R'* + lW)i + L'n}**.. '
These are very important constants concerned. Let also
tan X = (UnP - B'Q)/(B'P + I/n
tan
= 2
sin
n
2Ql/(c-*
-
cos
2QI).
'
These make O and l
2 angles less than 90.
Then the potential V at
distance x at time t is
. (396)
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 63
and the current C is
-Qx-0 + + + _
p* e
sin
(nt
Qx
-
6 l
<9 2 )
e~ px sin (nt
"
l
+ *
e
-* I 2 cos
H
2
J
Each of these consists of the sum of three waves, two positive, or from
x
= Q to ./
and one
/,
negative,
or
the
reverse way.
If the line were
infinitely long, we should have only the first wave. But this wave is reflected at x = l and the result is the second term. Reflection at the
t
x = end produces the third and least important term.
The wave-speed is n/Q, and the wave-length 2ir/Q. As the waves
travel their amplitudes diminish at a rate depending upon the magni-
tude of P.
The
angles
O l
and
2 merely settle the phase-differences.
The limiting case is wave-speed = i\ and no dissipation.
The amplitude of the current (half its range) is important. It is
c
r o
(Sn)*
ryt'-*) + c-^1-" +
2
cos
2Q(l
-
x)~\*
(R* + LV}*\_~~
+ ?pl
-*
- 2 cos 2QI
'
J
at any distance .r. At the extreme end x = l it is
+ 1"
'""
g
-
2
cos
As it is only the current at the distant end that can be utilised there,
it is clear that (416) is the equation from which valuable information is
to be drawn.
E It must now be explained how to get
f
and
Lf ,
and
their
meanings.
Go back to equation (286), Section xxvii. [p. 54], which is the deter-
minantal or differential equation when dielectric displacement is ignored.
We may write it
When p is d/dt it is the differential equation of the boundary magnetic
force, or of C, since they are proportional. Separating into even and
odd powers of p it will take the form, if we operate on (7,
where
R*
and
Lf
are
functions
p of
2
.
To suit the oscillatory state, put
R - 2 ??.
for
2
p* ,
making
f and Lf constants.
They will be of the form
I4; ............... (436)
where
R{
depends
on
the
wire,
R(
on
the
return ;
L{ on the wire, L(
on the return, and L on the intermediate insulator. The forms of R{
and L{ have been given by Lord Rayleigh.
They
are,
if
2
g
where
R l
= steady
resistance
of
the
wire
per
unit
length,
64
ELECTRICAL PAPERS.
3
11#
77 = i f i _ JoL^t+-ioioavo~n
to<J"
!2-'.28.80
(446)
U to the last of which I have added an additional term. The getting ot
the forms of Rt, and 2, depending upon the return, is less easy,
though only a question of long division. I shall give the formula later. At present I give their ultimate forms at very high frequencies.
Let = p resistivity, and q = frequency = n/'2ir, then
(456)
These are also Lord Rayleigh's. For the return we have
^/ = (Wsg)*
74 = m/n
(466)
I express R{ and R( in terms of the resistivity rather than the
resistance of the wire and return because their resistances have really
nothing to do with it, as we see in especial from the It?2 formula. The
Rf z
of
the
tube
depends
upon
its
inner
radius
only,
no
matter
how
thick
it may be, that is to say upon extent of conducting surface, varying
inversely as the area, which is 2;r 2 per unit length. The proof of (466)
will follow.
Now, as regards the meanings. Let us call the ratio of the impressed
force to the current in a line when electrostatic induction is ignorable
the Impedance of the line, from the verb impede. It seems as good a
term as Resistance, from resist. (Put the accent on the middle e in
impedance.) When the flow is steady, the impedance is wholly con-
ditioned by the dissipation of energy, and is then simply the resistance
Rl of the line. This is also sensibly the case when the frequency is
very low ; but with greater frequency inertia becomes sensible. Then
L + 2
(Pi'
Lrri2)^
is
the
impedance.
Here fi and
are, in the ordinary
sense, the resistance and inductance of unit length of line, including
wire and return. When, further, differences of current-density are
sensible,
the
impedance
is
f2
(R
+
U-n^l.
This is greater or less than
the former, according to the frequency, becoming ultimately less,
U especially if the wire is of iron, owing to the then large reduction in the
value of as compared with L.
Now, when we further take electrostatic induction into account we
shall have the above equations (346) and (356), in which PJ and Lf are
the same as if there were no static charge. The proof of this I must
also postpone. It is the only thing to be proved to make the above
quite complete, excepting (466), which is a mere matter of detail. The
proof arises out of the short sketch I gave in Section xxvu. of the
general electrostatic investigation, used there for illustration.
The impedance
is
made variable ;
it is no
longer
the
same
all
along
the line, simply because the current-amplitude decreases from the place
of impressed force, where it is greatest, to the far end of the line,
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 65
where it is least. The question arises whether we shall confine imped-
ance according to the above definition to the place of impressed force,
or extend its meaning. If we confine the use, a new word must be
invented. I therefore, at least temporarily, extend the meaning to
signify the ratio of F" to 6' anywhere.
It is very convenient to express impedance in ohms, whatever may be
its ultimate structure. Thus the greatest impedance of a line is what
its resistance would have to be in order that in steady-flow the current
should equal that arriving at the far end under the given circumstances.
It will usually be far greater than the resistance. But there is this
remarkable thing about the joint action offerees of inertia and elasticity.
The impedance may be far less than in the electromagnetic theory.
F JW)k That is,
/(7
according
to
(41ft)
may be
far
less
than
+ 2
(/2'
This is clearly of great importance in connection with the future of
long-distance telegraphy ana telephony.
(In passing I will give an illustration of reduction of impedance pro-
duced by inertia. Let an oscillatory current be kept up in a submarine
cable and in the receiving coils. Insert an iron core in them. The
result is to increase the amplitude of the current-waves. More fully,
increasing the inductance of the coil continuously from zero, whilst
keeping its resistance constant, increases the amplitude up to a certain
U point, after which it decreases. The theory will follow.) To get the submarine cable formulae, ignoring inertia, take
= and
PJ 11. To get the more correct formulae, not allowing for variations
of current-density, but including inertia, take Lf = L the steady induct-
R ance, and f = R. To get the linear magnetic theory formulae, take
= 0,
arid
L' = L,
R' = R.
Finally, using R' and J7, but with
=0, we
have the complete magnetic formulae suitable for short lines. Thus
S=0 in (4:11) brings it to
R U Equations (34ft) to (36ft) are true generally, that is, with f and the
proper functions of d/dt. The solution in the case of steady impressed
force will follow, including the interior state of the wire. Also the
interior state in the oscillatory case.
A great deal may be dug out of (41ft). In the remainder of this
Section, however, we may merely notice the form it takes at very high
frequencies, so high as to bring surface conduction into play, and show how much less the impedance is than according to the magnetic theory.
Let n be so great as to make B'/L'n small. Then we may also take
Q = n/v.
Also,
if
pl f.~
is
small,
as it
will
be
on
increasing the
frequency, we
need only consider the first term under the radical sign in (41ft),
which becomes
(*
Take for R' its ultimate form
H.E.P. VOL. II.
ELECTRICAL PAPERS.
got from (455) and (46&) by supposing wire and sheath of the same
= material, and 2/a + l/a1 l/a2 .
Then the impedance is
where exp is defined by e* = exp x, convenient when x is complex. Here
L Q
is
a
numeric,
and
= 30 ohms (i.e., when we reckon the impedance
in ohms); ^ = 1600 and /*=!, if the conductors are copper; and
= / 10 5^, if ^ is the length of the line in kilom. ; therefore
= 15Z x
To see how it
works
out,
take
L Q
=
1,
a= 1
cm,
and
q = 104 ;
then
F /(7 = 1 5 x exp 4^/300 ohms.
If the line is 100 kilom., PI is made 1-J, which is too small for our
approximate formula. If 1,000 kilom., it is made 13J, which is rather large. Pl= 10 is large. If it is 500 kilom., then
jr
Q
/C
= 15
x exp 6f = 1,178
ohms.
So the impedance is only 1,178 ohms at 500 kilom. distance at the enormous frequency of 10,000 waves per second. It is of course much less at a lower frequency, but the more complete formula will have to be used if it be much lower.
Now compare this real impedance with the resistance of the line in the
steady state, its effective resistance according to the magnetic theory,
and the impedance according to the same. The resistance of the line we may take to be twice that of the wire, by choosing the return of a
proper thickness, or
Rl= 2 x 500 x 10 5 x 1600/7r = 50 ohms, say.
L will be a little more than 1J, say 1-6, therefore Lln='8x27rx 104 = 5060,
U so that the linear-theory impedance is nearly 5,100 ohms. But, owing to the high frequency, we should use R' and
instead
R of
and L ;
here take L' = L
+ P/jn,
then
This large increase of resistance is more than counterbalanced by the reduction of inductance, so that the impedance is brought down from the above 5,100 to about 3,500 ohms, the magnetic theory impedance; and this is about three times the real impedance at its greatest, viz., at the distant end of the line.
It is further to be noted that the wire and return need not be solid,
as we see from the value of R! compared with R. What is needed at
very high frequencies is two conducting sheets of small thickness, of the highest conductivity and lowest inductivity ; i.e., of copper.
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 67
SECTION XXX. IMPEDANCE FORMULA FOR SHORT LINES.
RESISTANCE OF TUBES.
In the case of a short line, a very high frequency is needed in general
to make it necessary to take electrostatic induction into account in estimating the impedance. Keeping below such a frequency, the impedance per unit length is simply
This is greater than the common (R2 + L2n2)% at first, when the
frequency is low, equal to it at some higher frequency, and less than it
for still higher frequencies. Thus, for simplicity, let the return con-
tribute
nothing
to
the
resistance or the
inductance ;
then, using (446),
we shall have
- <"
R and L being the steady resistance and inductance of the line per unit
R U length (the latter to include L for the external medium), f and the
real values at frequency w/27r per second, p the inductivity of the wire, and g = (pn/It)*.
Thus the first increase in the square of the impedance over that of
the
linear
theory
is
2
J/^% ,
independent
of
resistance;
large in iron,
small in copper.
But
as
the
frequency
is raised,
the
2
g
term
becomes
We sensible ;
being negative,
it puts a stop to the increase.
can get a
rough idea of the frequency required to bring the impedance down to
that
of
the
linear
theory
by
ignoring
the
3
g
term.
This gives
(48i)
The real frequency required must be greater than this, and taking
the
s
g
term
into
account,
we
shall
obtain,
as
a
higher
limit,
........................ (496)
We approximately.
see that the simpler (486) is near enough.
If the wire is of copper of a resistance of 1 ohm per kilom., making
R= 104 ,
we
shall
have,
using
(486),
If the return is distant, we can easily have L = 9. Then the
frequency required is about 100 waves per second. This is a low
telephonic frequency, so that we see that telephonic signalling is
somewhat assisted by the approximation to surface conduction.
If the wire
is
of iron,
then,
on
account
of the
large value
of /x,
a
much
lower frequency is sufficient to reduce the impedance below that of the
linear theory ; that is, an iron wire is not by any means so disadvan-
68
ELECTRICAL PAPERS.
tageous, compared with a copper wire of the same diameter, as its higher resistivity and far higher inductivity would lead one to expect.
But it is not to be inferred that there is any advantage in using iron, electrically speaking, from the fact that the impedance is so easily made much less than that of the linear theory. Copper is, of course, the best to use, in general, being of the highest conductivity, and lowest inductivity. Nor is any great importance to be attached to the matter in any case, for, on a short line, to which we at present refer, it will usually happen that the telephones themselves are of more importance
than the line in retarding changes of current.
We also see that in electric-light mains with alternating currents
there may easily be a reduction of impedance if the wires be thick and the returns not too close. On the other hand, the closer they are
brought the less is the impedance, according to the ordinary formula.
It should be borne in mind that we are merely dealing with a correction,
not with the absolute value of the impedance, which is really the
important thing.
Now take the frequency midway between and the second frequency w^hich gives the linear-theory impedance. Then IF + L-ifi becomes
wherein use the value of n 2 given by (486). The increase of impedance
is not, therefore, in a copper wire, anything of a startling nature.
We Impedances are not additive, in general.
cannot say that the
impedance of a wire is so much, that of a coil so much more, and then
that their sum is the impedance when they are put in sequence, at the
same frequency.
In passing, I may as well caution the reader against the false idea
somewhere prevalent. The increased resistance of a wire is not in any
way caused or evidenced by the weakness of the current in the variable
period compared with its final strength, a result due to the back E.M.F.
of inertia. No matter how great the inertia, and how slowly it makes
the current rise, there is no change of resistance, unless there be
changed distribution of current. There must always be some change,
but it is usually negligible. When, however, as notably in the case of
iron, the central part of the wire is inoperative, of course this changed
distribution of current means a large increase of resistance, though not
of impedance, which is reduced. It is a hollow tube, not a solid wire,
that must, to a first approximation, be regarded as the conductor.
There cannot be said to be any definite resistance unless the current
distribution is definite.
Thus, in the rise of the current from zero to the steady state there is,
presuming that there is large departure from the regular final distribution, no definite resistance, and it is clearly not possible to balance a wire in which the above takes place against a thin wire, a conclusion that is easily verified. But the case of simple-harmonic impressed force is peculiar. The distribution of current, though not constant, goes through the same regular changes over and over again in such a manner
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 69
that the total current at every moment is the same as if a true linear
circuit of definite resistance and inductance were substituted. This is
very considerably departed from when mere rapid makes and breaks
are employed.
Consider now the resistance of a tube at a given frequency. It
depends materially upon whether the return-current be within it or
^ outside it. Let there be two tubes, and the inner and outer radii
of
the
inner,
and
a.2
and
a 3
of
the
outer.
By an easy extension of
equation (286), the form quoted in the last Section, the differential
equation of the total current is
the dots indicating repetition of what is above them. The first term is for the insulator between tubes, the second for the inner tube, the
third for the outer. Or,
U where R(, 1&, L{,
2
are
functions
p of 2 ,
and
therefore
constants
when
the current is simple-harmonic. The division of the numerators by
the denominators, a simple matter in the case of a solid wire, becomes
a very complex matter in the tube case.
I
give
the
results
as
far
p as
2
.
It is not necessary to do the work separately for the two tubes, for,
if we compare the expressions carefully, we shall see that they only
differ in the exchange of the inner and outer radii, and in changed
sign of the whole.
For the inner tube we have
where 11^ is the steady resistance per unit length. This is the coefficient
of p, and is therefore nothing more than the inductance per unit length
of the
tube
in
steady flow,
the first correction to which
depends
p on
3
.
This may be immediately verified by the square- of-force method.
The resistance of the inner tube per unit length is
To obtain, from (516) and (526), the corresponding expressions for
R the
outer
tube,
change
7?
x
to
v
pl
to
pB,
/^
to /A3,
a x
to
and a
2,
to aB .
The change of $ign is not necessary, because it is involved in the
E substitution of E^ for v Or, simply, (516) and (526) holding good
when the return is outside the tube, exchange a^ and a , and we have
the corresponding formulae when the return is inside it.
70
ELECTRICAL PAPERS.
Let & = Jftj.
This removes a fourth part of the material from the
central part of a solid wire of radius ar The return being outside,
the resistance is
x '01 2.
If
solid,
the
'012
would be
*083 ;
or the
correction
is
reduced
seven
times by removing only a fourth part of the material.
But if the return is inside, all else being the same, the resistance is
^ R{ = R,+ B^nftiraHfr) x -503 = + P^n^iraf/p,) x -031,
so now the correction is reduced less than three times instead of seven
times, as when the return was outside.
This difference will be, of course, greatly magnified when the ratio
di/ctQ is large ; for instance, consider a solid wire surrounded by a very
thick tube
for return ;
the steady resistance
of the return will be
only a
small fraction of that of the wire, but the percentage increase of resistance of the outer conductor will be a large multiple of that of the wire.
Thus the earth's resistance, which, in spite of the low conductivity, is so small to a steady current, will be largely multiplied when the current
is a periodic function of the time.
Now, as regards the resistance of the tube at high frequencies. If
the return is outside it is
q being the frequency. But if the return is inside, it is
thus depending upon the inner radius when the return is inside, and on the outer when it is outside, for an obvious reason, when the position
of the magnetic field where the primary transfer of energy takes place
is considered.
Suppose we fix the outer radius, and then thin the tube from a solid wire down to a mere skin. In doing so we increase the steady resistance as much as we please. But the high-frequency formula (536)
remains the same. Now, as it would involve an absurdity for the
resistance to be less than that in steady flow, it is clear that (536)
cannot be valid until the frequency is so high as to make R{ much greater
R than lt which is itself very great when the tube is thin. That is to
say, removing the central part of a wire, when the return is outside it,
makes it become more a linear conductor, so that a much higher
frequency
is
required
to
change
its
resistance ;
and when the tube is
very thin the frequency must be enormous. Practically, then, a thin
tube is always a linear conductor, although it is only a matter of raising
the frequency to make (536) or (546) applicable.
To get them, use in (506) the appropriate J (x), etc., formulae when x
is very large. They are
J= (x)
- KI(X) = (sin x + cos x) -f
K J^x) =
= Q (x) (sin x - cos x) + (TTX)%. )
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 71
These, used in (50&), putting the circular functions in the exponential forms, reduce it to
where i = (- l)i Here
=
sfai ^iTfaJcflfp,
therefore
and
similarly
for
s s;
so we get
Here,
since p2 =
- n2 ,
pl = (Jw)*(l +i) ;
which brings us to
where
^'M*!1'
fM =
f!
<i)
as before given, except that the inner tube was a solid wire.
If, however, the frequency were really so high as to make these highfrequency formulae applicable when the conductors are thin tubes, it is clear that we should, by reason of the high frequency, need, at least in
general, to take electrostatic induction into account even on a short
line, and therefore not estimate the impedance by the magnetic formulae,
R but by the more general of the last Section, in which the same f and
Lr occur. As for long lines, it is imperative to consider electrostatic
induction. There is no fixed boundary between a "short" and a "long" line; we must take into account in a particular case the
circumstances which control it, and judge whether we may treat it as a short or a long-line question. To the more general formula I shall
return in the following Section, merely remarking at present that there is a curious effect arising from the to-and-fro reflection of the electro-
magnetic waves in the dielectric, which causes the impedance to have maxima and minima values as the speed continuously increases ; and that when the period of a wave is somewhere about equal to the time taken to travel to the distant end and back, the amplitude of the
received current may easily be greater than the steady current from the
same impressed force. And, in correction of the definition in Section
V xxix. of as the surface potential of the wire, substitute this defini-
tion, Q = SF, where Q is the charge and S the electrostatic capacity,
both per unit length of wire.
SECTION XXXI. THE INFLUENCE OF ELECTRIC CAPACITY. IMPEDANCE FORMULAE.
Let us now return to the more general case of Section XXIX., the
amplitude of the current due to a simple-harmonic impressed force at one end of a line. Although the formula (416) for the amplitude at the distant end is very compact, yet the exponential form of the functions does not allow us to readily perceive the nature of the change made by lengthening the line, or making any other alteration that will cause the
72
ELECTRICAL PAPERS,
effect of the electric charge to be no longer negligible, by causing the
magnetic formula to be sensibly departed from. Let us, therefore, put
(416)
in
the
form
F" /(7
= etc.,
and
then
expand
the
right
member
in
an
infinite series of which the first term shall be the magnetic impedance
itself, whilst the others depend on the electric capacity as well as on the
resistance and inductance.
On expanding the exponentials and the cosine in (416), we obtain a
P P series in which the quantities
4-
Q,\
6-
^6 ,
etc.,
occur,
all
divided by
To put these in terms of the resistance, etc., we have, by (376),
P* + Q* = SnI,
2PQ = SnR',
Q2 -pi = Sn*L', ...(586)
where
/=(' + Z'% 2
2
)i
........................... (596)
/ being the short-line impedance per unit length. Using these, we
convert (416) to the following form,
*
...... (606)
V Here we may repeat that Q and G' are the amplitudes of the impressed
force at one end and of the current in the wire at the other end of the
R double wire of length Z, whose "constants" are
f ,
Z/,
and
S,
the
R resistance, inductance, and electric capacity per unit length, f and
Lf being functions of the frequency already given. I do not give more
terms than are above expressed, owing to the complexity of the coefficients of the subsequent powers of S. To go further, it will be
desirable to modify the notation, and also to entirely separate the
terms depending upon resistance in the [ ] from the others. Let
SLf = v-\
f=(Bf/I/n)*,
= h nljv. ../. ..... (616)
Here v is a velocity, / and h numerics. The least value of the velocity
is (SL)~t, at zero frequency, L being the full steady inductance per
unit length, as before. As the frequency increases, so does v. Its
(L limiting value is
)"* or (/*2c.2 )~, the speed of undissipated waves
through the dielectric.
The
/ ratio
falls
from
infinity
at
zero
fre-
quency, to zero at infinite frequency. See equations (436) to (466).
The ratio h is such that lift* is the ratio of the time a wave travelling
at speed v takes to traverse the line, to the wave-period.
In terms of /, /, and h, our formula (416), or rather (606), when extended, becomes
From this, seeing that in the [], resistance appears in / only, we see
that the corresponding no-resistance formula is simply
Vsia-> ..................... (636)
where, of course, v is the speed corresponding to L , or the speed of un-
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 73
dissipated waves. The sine must be reckoned positive always. To
We check (636), derive it immediately from (416) by taking = 11 0.
shall
find the following form of (416) in terms of/ and h useful later :
F = /C'
\Vv(\
2/v
+/)<{<
+
*-'-"''
-
2
cos
2$}*,
(646)
where
Pl = h(W{(l +/)*- 1}*, 1
W-MJWO +/)*+!}*- /"
Let us now dig something out of the above formulae. This arith-
metical digging is dreadful work, only suited for very robust intellects.
I shall therefore be glad to receive any corrections the following may
require, if they are of any importance.
It will be as well to commence with the unreal, but easily imaginable
case of no resistance. Let the wire and return be of infinite conductivity.
We have then merely wave propagation through the dielectric, without
any dissipation of energy, at the wave-speed = (/*2c2)~* which is, in
air, that of light-waves. Any disturbances originating at one end
travel
unchanged
in
form ;
but
owing
to
reflection
at
the
other
end,
and then again at the first end, and the consequent coexistence of
oppositely travelling waves, the result is rather complex in general. Now, if we introduce a simple-harmonic impressed force at one end, and
adjust its frequency until the wave-period is nearly equal to the time
taken by a wave to travel to the other end and back again at the speed
r, it is clear that the amplitude of the disturbance will be enormously
augmented by the to-and-fro reflections nearly timing with the impressed
force. This will explain (636), according to which the distant-end impedance falls to zero when
= nl/v IT, or 27r, or STT,
etc.
Here '27r/n is the wave-period, and 21/v the time of a to-and-fro journey. The current-amplitude goes up to infinity.
If, next, we introduce only a very small amount of resistance, we may
easily conclude that, although the impedance can never fall to zero, yet,
at particular frequencies, it will fall to a minimum, and, at others, go
up
to
a
maximum ;
and
that the range between the consecutive maxi-
mum and minimum impedance will be very large, if only the resistance
be low enough.
Increasing the resistance will tend to reduce the range between the
maximum and minimum, but cannot altogether obliterate the fluctua-
tions in the value of the impedance as the frequency continuously
increases. In practical cases, starting from frequency zero, and raising
it continuously, the impedance, which is simply M, the resistance of the
line, in the first place, rises to a maximum, then falls to a minimum, then rises to a second maximum greater than the first, and falls to a second minimum greater than the first, and so on, there being a regular increase in the impedance on the whole, if we disregard the fluctuations,
whilst the fluctuations themselves get smaller and smaller, so that the real maxima and minima ultimately become false, or only tendencies
towards maxima and minima at certain frequencies.
By this to-and-fro reflection, or electrical reverberation or resonance,
74
ELECTRICAL PAPERS,
the amplitude of the received current may be made far greater than the
strength of the steady current from the same impressed force, even when the electrical data are not remote from, but coincide with, or
resemble, what may occur in practice. To show this, let us work out
some results numerically. As this matter has no particular concern with variations of current-
density in the conductors, ignore them altogether; or, what comes to
R the same thing, let the conductors be sheets, so that f = R, the steady L resistance, and Lf = Q very nearly, the dielectric inductance, both per
unit length. Then, in (646), let
/=!,
= QI TT,
v = 30ohms.............. (665)
Then, by the second of (656), we find that h = 2-85;
r iV- ? and, by (646), that
o/ao =
+ " = 2i '8284ir [
- 8284T 2
60 ' 6 ^o ohms ....... (676)
The ratio of the distant-end impedance to the resistance is therefore
60-6 x 109 _60-6 x 1 Q9 _= 20-2 _ 202
.
~1T~
nl
107* ~285'
by making use of the data (666). That is, the amplitude of the
received current is 42 per cent, greater than the steady current, when
= (666) is enforced.
But let 6Z j7r, then
To/Co = JV.21^' +
-*]J
=
28
L Q
ohms ;
-- -* and the ratio of impedance to resistance is
or the amplitude of current is only 3/4 of the steady current.
And if = Ql JTT, we shall find
F /<7 = 43-5 ohms,
and that the impedance is slightly greater than the resistance.
r if = Ql ITT, we shall have
o/ao = 47-8 ohms,
Whilst,
and find the ratio of impedance to resistance to be 63/85, making the
received current 35 per cent, stronger than the steady current.
The above data of/= 1, and = Ql JTT, JTT, JTT, and TT, have been chosen in order to get near the first maximum and minimum of impedance.
The range, it will be seen, is very great. Let us next see how these
data resemble practical data in respect to resistance, etc. Remember
that
1
ohm
per kilom.
makes
.R=10 4 ,
(resistance
per
cm.
of double
R conductor). Also, that/= 1 means
= nl=
10 5 nlv
if
/j
is
in
kilometres.
Then, in the case to which (666) to (686) refer, we shall have, first
assuming a given value of fi, then varying Z- , and deducing the values
of n and /,, the following results :
^=10 3 ,
=1,
n= 103 ,
Z = 10, = /z 10 2
,
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 75
Tin's is an excessively low resistance, T\j- ohm per kilom. ; the frequencies are rather low, and the lengths great. Next, 1 ohm per kilom. :
R = W,
=1,
n=W\
/ = 85. 1
Z = 10, = ?t 10 3
,
/ = 856. 1
=100,
n = 102 ,
^ = 8568.
The L = 100 case is extravagant, requiring such a very distant return
current (therefore very low electric capacity). Next, 10 ohms per
kilom. :
=1,
L =10,
Lastly, very high resistance of 100 ohms per kilom. :
E=IW,
L =10,
n=l&,
= / 8-5. 1
In all these cases the amplitude of received current is 42 per cent.
greater than the steady current.
In the next case, = Ql JTT, the quantity nl/v has a value one-fourth of
R that assumed
in
the
above ;
hence, with the same
and jL and same ,
frequency, the above values of ^ require to be quartered. Then, in all
cases, the current-amplitude will be three-fourths of the steady current.
Similarly, to meet the = ()/ i?r .case, use the above figures, with the l^s
halved ;
and in the
Ql = JTT case,
with the
l^a multiplied by f.
A consideration of the above figures will show that there must be, in
telephony, a good deal of this reinforcement of current strength some-
times ;
not merely that the electrostatic
influence tends to increase the
amplitude all round, from what it would be were only magnetic
induction concerned, but that there must be special reinforcement of
certain tones, and weakening of others. It will be remembered that
good reproduction of human speech is not a mere question of getting
the lower tones transmitted well, but also the upper tones, through a
long range ; the preservation of the latter is required for good articula-
tion. The ultimate effect of electrostatic retardation, when the line is
long enough, is to kill the upper tones, and convert human speech into
mere murmuring.
The formula (625) is the most useful if we wish to see readily to
what extent the magnetic formula is departed from. In this, two
quantities
only
are
concerned, / and
h,
or
2
(IV/ L'n)
and
nl/v;
and
if both
/and h are small, it is readily seen that the first form of (636) applies,
the factor by which the magnetic impedance is multiplied being
(amh)/h. Even when h is not small the /terms in (626) may be negli-
gible, and the first form of (636) apply.
For
example,
suppose
h= -y t
and /small, then = (sin h) /h 3 x '3272 = -9816, showing a reduction of
2 per cent, from the magnetic impedance.
Now,
this
= i /i
means
nl = l
10 5 ,
or
the
high
frequency
of
10
5
/2?r
on
a
line
of
one kilom.,
10
4
/2;r
on
10
kilom., and so on, down to 10/2?r
on
10,000 kilom., always provided the / terms are still negligible. This
may easily be the case when the line is short, but will cease to be true
76
ELECTRICAL PAPERS.
as the line is lengthened, owing to the n in / getting smaller and
smaller. Thus, in the just-used example, if the resistance is 10 ohms
L= per kilom., and
/= 10, we shall have
TJT on the line of 1 kilom.,
/= and
1 on 10 kiloms. So far, the / terms are negligible, and the
first form of (636) applies. But / becomes 100 on 100 kiloms., which
/= will
make an appreciable,
though
not
large,
difference ;
and
10,000
on 1,000 kilom. will make a large difference and cause the first (636)
formula to fail. It is remarkable, however, that this formula should
have so wide a range of validity.
In the above we have always referred to the distant-end impedance.
But at the seat of impressed force there is a large increase of current on
account of the "charge." Thus, at # = 0, by the formula preceding
(416), we have
-
The term impedance is of course strictly applicable at the seat of impressed force. As the frequency is raised, this impedance tends to be
represented by
and, ultimately, by if the dielectric be air.
L ^o/^o = A>v = 30
ohms, .................. (706)
L is usually a small number.
SECTION XXXII. THE EQUATIONS OF PROPAGATION ALONG WIRES. ELEMENTARY.
In another place (Phil. Mag., Aug., 1886, and later) the method
adopted by me in establishing the equations of Fand C, Section xxix.,
was to work down from a system exactly fulfilling the conditions
involved in Maxwell's scheme, to simpler systems nearly equivalent,
but more easily worked. Remembering that Maxwell's is the only
complete scheme in existence that will work, there is some advantage
in this ;
also, wre can see
the degree of approximation when a change is
made. In the following I adopt the reverse plan of rising from the first
rough representation of fact up to the more complete. This plan has,
of course, the advantage of greater intelligibility to those who have not
studied Maxwell's scheme in its complete form ; besides being, from an
educational point of view, the more natural plan.
Whenever the solution of a so-called physical problem has been
obtained, according to which, under such or such conditions, such or
such effects must happen, what has really been done has been to solve
another problem, which resembles the real one more or less in those
features we wish to study, which we regard as essential, whilst it is of
such a greatly simplified nature that its solution is, in comparison with
that of the real problem, quite elementary. This remark, which is of
rather an obvious nature, conveys a lesson that is not always remem-
bered ; that the difference between theory and empiricism is only one of degree, even when the word theory is used in its highest sense, and
ELECTROMAGNETIC INDUCTION AND ITS PROPAGATION. 77
is applied to legitimate deductions from laws which are known to be
very true indeed, within wide limits.
It is quite possible to imagine the solution of the general problem of
the universe. There does not seem to be anything against it except its
possible infinite extent. Stop the extension of the universe somewhere ;
then, if its laws be fully known, and be either invariable or known to
vary in some definite manner, and if its state be known at a given moment, it is difficult to see how it can be indefinite at any later time,
even in the minutest particulars in the history of nations or of animal-
cule, or in the development of a human soul (which is certainly im-
mortal, for the good and evil worked by a soul in this life live for ever,
in the permanent impress they make on the future course of events).
But if this be imagined to be all done, and the universe made a
machine, no one would be a bit the wiser as to the reason why of it.
(Even if we ask what we mean by the reason why, we shall in all pro-
bability get into a vicious circle of reasoning, from which there is no
escape.) All that would be done would be the formulation of facts in
a complete manner. This naturally brings us to the subject of the
equations of propagation, for they are merely the instruments used in
attempts to formulate facts in a more or less complete manner.
The first to solve a problem in the propagation of signals was Ohm,
whose investigation is a very curious chapter in the history of electricity,
as he arrived at results which are, under certain conditions, nearly
Ohm correct, by entirely erroneous reasoning.
followed the theory of
the conduction of heat in wires, as developed by Fourier. Up to a
certain point there is a resemblance between the flow of heat and the
electric conduction current, but after that a wide dissimilarity.
Let a wire be surrounded by a non-conductor of heat, in imagination ; let the heat it contains be indestructible when in the wire, and be in
a state of steady flow along it. If C is the heat-current across a given
V section, and the temperature there, C will be proportional to the rate
V of decrease of alon the wire. Or
R if ./ be length measured along the wire. The ratio
of the fall of
temperature per unit length, to the current, is the "resistance" per unit length, and is, more or less, a constant. Or, the current is proportional to the difference of temperature between any two sections, and
is the same all the way between.
The law which Ohm discovered and correctly applied to steady con-
duction currents in wires is similar to this. Make C the electric
current in the wire, and Fthe potential at a certain place. The current, which is the same all the way between any two sections, is proportional to their difference of potential. The ratio of the fall of potential to the current is the electrical resistance, and is constant (at the same tem-
perature). But Kis, in Ohm's memoir, an indistinctly defined quantity,
V called electroscopic force, I believe. Even using the modern equivalent
potential, there is not a perfect parallel between the temperature and the potential V. For a given temperature appears to involve a definite
78
ELECTRICAL PAPERS.
physical state of the conductor at the place considered, whereas potential has no such meaning. The real parallel is between the tem-
perature gradient, or slope, and the potential slope.
Now, returning to the conduction of heat, suppose that the heatcurrent is not uniform, or that the temperature-gradient changes as we
pass along the wire. If the current entering a given portion of the wire at one end be greater than that leaving it at the other, then, since the heat cannot escape laterally, it must accumulate. Applying this to
the unit length of wire, we have the equation of continuity,
t being the time, and q the quantity of heat in the unit length. But the temperature is a function of j, say
i-sr, where S is the capacity for heat per unit length of wire, here regarded,
for simplicity of reasoning, as a constant, independent of the temperature. This makes the equation of continuity become
Between this and the former equation between C and the variation of F, we may eliminate C and obtain the characteristic equation of the
temperature,
which, when the initial state of temperature along the wire is known,
enables us to find how it changes as time goes on, under the influence
of given conditions of temperature and supply of heat at its ends.
Ohm applied this theory to electricity in a manner which is sub-
stantially equivalent to supposing that electricity (when prevented from
leaving the wire) flows like heat, and so must accumulate in a given
portion of the wire if the current entering at one end exceeds that
leaving at the other. The quantity q is the amount of electricity in the
unit length, and is proportional to F", their ratio S being the capacity per unit length. With the same formal relations we arrive, of course,
at the same characteristic equation, now of the potential, so that elec-
tricity diffuses itself along a wire, by difference of potential, in the same
way as heat by difference of temperature.
A generation later, Sir W. Thomson arrived at a system which is
formally the same, but having a quite different physical significance.
Between the times of Ohm and Thomson great advances had been made
in electrical science, both in electrostatics and electromagnetism, and
We the quantities in the system of the latter are quite distinct.
have
(mnbb])
where on the left appear the elementary relations, and on the right the resultant characteristic equation of V.