zotero/storage/IDQYSG9S/.zotero-ft-cache

arXiv:1902.03895v1 [gr-qc] 11 Feb 2019

On the general relativistic framework of the Sagnac eﬀect
February 12, 2019
1Elmo Benedetto, 2Fabiano Feleppa, 3Ignazio Licata, 4Hooman Moradpour and 5Christian Corda
1Università di Salerno, Dipartimento di Informatica, Via Giovanni Paolo II, 132, 84084 Fisciano SA
2Department of Physics, University of Trieste, via Valerio 2, 34127 – Trieste, Italy
3,4,5Research Institute for Astronomy and Astrophysics of Maragha (RIAAM), P.O. Box 55134-441, Maragha, Iran and International Institute for Applicable Mathematics & Information Sciences (IIAMIS), B.M. Birla Science Centre, Adarsh Nagar, Hyderabad - 500 463, India
E-mails:1
Abstract The Sagnac eﬀect is usually considered as being a relativistic eﬀect produced in an interferometer when the device is rotating. General relativistic explanations are known and already widely explained in many papers. Such general relativistic approaches are founded on Einstein’s equivalence principle (EEP), which states the equivalence between the gravitational "force" and the pseudo-force experienced by an observer in a non-inertial frame of reference, included a rotating observer. Typically, the authors consider the so-called Langevin-Landau-Lifschitz metric and the path of light is determined by null geodesics. This approach partially hides the physical meaning of the eﬀect. It seems indeed that the light speed varies by c ± ωr in one or the other direction around the disk. In this paper, a slightly diﬀerent general relativistic approach will be used. 1elmobenedetto@libero.it; f eleppa.f abiano@gmail.com; ignazio.licata3@gmail.com; hn.moradpour@gmail.com; cordac.galilei@gmail.com.
1

The diﬀerent "gravitational ﬁeld" acting on the beam splitter and on the two rays of light is analyzed. This diﬀerent approach permits a better understanding of the physical meaning of the Sagnac eﬀect.
1 Introduction
It can be useful to recall the context of the discovery of the Sagnac Eﬀect. At the beginning of previous century, physicists were engaged in a very long debate concerning absolute space and its counterpart, the aether, the hypothetical medium of propagation of light. In the well known gedankenexperiment of the rotating bucket ﬁlled with water, Newton deduced the existence of an absolute rotation with respect to absolute space. In one of the most important work in the history of science (Principia), he expatiated on time, absolute and relative space and motion [1]. Mach criticized Newton’s reasoning in his book published in 1893 [2]. From his perspective, one must consider the rotation of water relative to all the matter in the Universe. It is well known that Mach’s ideas had a considerable inﬂuence on the development of Albert Einstein’s general theory of relativity (GTR), especially during the ﬁrst years of the 20th century. Mach’s view led to a misconception about the GTR. A more complete analysis of the debate can be ﬁnd in [3]. After the formulation of the special theory of relativity and before its generalization to the GTR, also the French physicist Georges Sagnac took part in the debate. In 1899, he indeed developed a theory of the existence of a motionless mechanical aether [4]. His aim was to explain all optics phenomena within this theoretical framework, with special attention to the Fresnel-Fizeau experiment for the drag of light in a moving medium [5, 6]. At the beginning of the 20th century, he conceived a rotating interferometer to test his ideas. Despite countless explanations, in more than a hundred years, there are still diﬀerent interpretations of Sagnac experiment in the framework of the GTR. But this is not a rare thing in physics. In fact, it is not the only topic that, although it is well known in the scientiﬁc literature, still requires insights and explanations [7, 8]. In order to start, in next Sections, the Sagnac eﬀect in the framework of Classical Mechanics will be brieﬂy analyzed.
2 The Sagnac experiment within the framework of Classical Mechanics
One considers two light rays in opposite directions around a static circular loop of radius r. Such light rays will arrive at the end point simultaneously. Instead, if the loop is rotating, the ray travelling in the same direction as the rotation of the loop must travel a distance greater than the ray travelling in the opposite direction. For this reason, the counter-rotating ray will arrive earlier than the co-rotating ray. The length of the path is L = 2πr and, if there is not angular velocity of the loop, the duration of the path is
2

∆t = 2πr .

(1)

c

Instead, in the presence of an angular velocity ω = 0, one writes

c∆t1 = 2πr + rω∆t1,

(2)

c∆t2 = 2πr − rω∆t2,

(3)

from which one obtains

∆t1

=

2πr , c − rω

(4)

∆t2

=

2πr c + rω .

(5)

Assuming ω2r2 ≪ c2, the diﬀerence in the journey times is

∆t

=

∆t1

− ∆t2

=

4πr2ω c2 − ω2r2

≃

4πr2ω .
c2

(6)

3 The Sagnac eﬀect within the framework of the GTR

The scientiﬁc literature on the relativistic Sagnac eﬀect is very wide, see [8 24] for details. In this paragraph, its standard derivation in the framework of the GTR will be considered. Let us recall the standard ﬂat Lorentz-Minkowski metric in cylindrical coordinates

ds2 = c2dt2 − dr2 − r2dθ2 − dz2.

(7)

If one considers a system rotating at angular velocity ω, one gets the angle transform as θ = θ′ + ωt. Thus, dθ = dθ′ + ωdt. Starting from these considerations, the metric becomes the so called Langevin-Landau-Lifschitz metric [25, 26]

ds2 = (c2 − ω2r2)dt2 − dr2 − r2dθ′2 − dz2 − 2r2ωdθ′dt.

(8)

Inserting the condition of null geodesics ds = 0 in Eq. (8), one gets

1

−

ω2r2 c2

c2dt2 − dr2 − r2dθ′2 − dz2 − 2r2ωdθ′dt = 0.

(9)

Equation (8) describes a stationary metric which is a solution of Einstein ﬁeld equations in empty space. The EEP permits to interpret it in terms of a gravitational ﬁeld [25]. Besides, knowing how tensors behave, one has

Rijkl(t, x, y, z) = 0 ⇒ Rijkl(t, r, θ′, z) = 0,

(10)

3

where Rijkl is the Riemann curvature tensor. Following [27], the spatial metric can be written as

dl2 =

−gαβ

+

g0αg0β g00

dxα dxβ .

(11)

Hence, a bit of algebra gives

dl2 =

dr2

+

dz2

+

r2dθ′2

1

−

ω2r2 c2

.

(12)

Considering plane motion, one sets dz = 0 and, ﬁnally, one obtains

dl =

rdθ′ .

1

−

ω2r2 c2

(13)

Thus, by integrating Eq. (13), the length of the circumference is easily written down as

2π
ˆ l=
0

rdθ′ =

1

−

ω2r2 c2

2πr .

1

−

ω2r2 c2

(14)

Within the platform, the observer on the beam splitter expects both rays to

arrive

in

a

time

t

=

l c

.

At

this

point,

generally

one

studies

the

spacetime

metric

ds2 = c2 dt2 − 2r2dθ′ωdt − r2dθ′2,

(15)

and the path of the light rays is determined through the condition of null geodesics ds2 = 0. This condition gives

dt

=

r2ωdθ′

√ ± r4ω2dθ′2
c2

+ c2r2dθ′2

=

r2ωdθ′ ± r2dθ′ c2

ω2

+

c2 r2

,

(16)

which is well approximated by

dt

≈

r2ωdθ′ ω c2

±

c r

.

(17)

Then, one gets the solutions

dt1

=

r2ω+cr c2

dt2

=

r2

ω−cr c2

.

(18)

By integrating on the periphery of the disk and by observing that dt1 > 0 for dθ′ > 0 and dt2 > 0 for dθ′ < 0, one gets

4

Then, the time diﬀerence is

t1

=

2πr c

+

2πr2ω c2

t2

=

2πr c

−

2πr2 c2

ω

.

t1

−

t2

=

4πr2ω c2 .

(19) (20)

4 Coordinate velocity of light

The analogy with radial motion gives simpler calculations. In this case, the metric becomes

ds2 =

ω2r2 1 − c2

c2dt2 − dr2.

(21)

Considering a photon which directed from the center O to a point inﬁnitely near, the condition of null geodesics ds = 0 permits to obtain that temporal coordinate required for this as

cdt =

dr .

1

−

ω2r2 c2

(22)

The photon on the rim corresponds to

If

ωr c

≪

1,

one

gets

r
ˆ ct =
0

dr

1

−

ω2r2 c2

(23)

t

≃

r c

+

ω2r3 6c3

+

...

(24)

for the coordinate time.

Therefore, if one considers the laboratory clock, the photon’s ﬂight lasts

longer

than

r c

.

In

fact,

from

1

−

ω2r2 c2

c2dt2 − dr2 = 0

(25)

one sees that the coordinate velocity of light decreases with the distance from the center

dr dt

=

c

1

−

ω2r2 c2

.

(26)

Of course, this is an apparent eﬀect due to time dilation along the path but the local velocity of light is always c. Indeed,

5

dr = dr dt = c dτ dt dτ

1

−

ω2r2 c2

1

= c.

1

−

ω2r2 c2

(27)

5 Coriolis time delay

The Coriolis force has a general relativistic explanation. In [29], a general relativistic analysis permits indeed to determine the force on an observer moving with a uniform velocity in a coordinate system which rotates with a constant angular velocity ω = 0 as

−→F

=

−

m−→ω

∧

(−→ω

∧ −→r ) 1−

+ 2m
v′2 c2

(−→ω

∧

−→v )

,

(28)

where −→v is the velocity of the observer in the rotating system, −→v′ = −→v +(−→ω ∧ −→r )

is the total velocity of the observer relative to the non-rotating system, and m

is the total mass of the observer in the rotating system, see [29] for details. For

non-relativistic velocities (v′ ≪ c) Eq. (28) reduces to [29]

−→F ≃ −m−→ω ∧ (−→ω ∧ −→r ) − 2m (−→ω ∧ −→v ) ,

(29)

where

−→F c = −m−→ω ∧ (−→ω ∧ −→r )

(30)

is the centrifugal force on the observer and

−→F C = −2m ∧ (−→ω ∧ −→v )

(31)

is the Coriolis force. Now, one considers the local Lorentz gauge of the rotating observer [30]. This is the gauge in which the space-time is locally ﬂat and the distance between any two points is given simply by the diﬀerence in their coordinates in the sense of Newtonian physics, [30]. In this gauge, “gravitation” manifests itself by exerting “tidal forces” on the masses. Equivalently we can say that there is a “gravitational” potential [30]

V = −→v · (−→ω ∧ −→r ) ,

(32)

which generates the the Coriolis “tidal force” of Eq. (31), and that the motion of the test mass is governed by the Newtonian equation

−→¨r = − ▽ V.

(33)

As we are considering a circular motion on the rotating platform, we simply have V = vωr. Thus, one considers the time dilatation in the weak ﬁeld approximation by using a well known formula which connects the Newtonian approximation with the linearized GTR [27]

dτ =

(1

+

2V c2

)dt

≃

1

+

V c2

dt =

1

+

vωr c2

dt.

(34)

6

The time delay between the beam splitter and the light rays is

dτ1 =

1

+

vωr c2

dt =

1

+

vωr c2

rdθ v

=

r v

+

ωr2 c2

dθ

dτ2 =

1

−

vωr c2

dt =

1

−

vωr c2

rdθ v

=

r v

−

ωr2 c2

dθ.

The two Eqs. (35) can be integrated as

2π

τ1 = ´

r v

+

ωr2 c2

dθ

=

2πr v

+

2πr2ω c2

0

Thus,

2π

τ2 = ´

r v

−

ωr2 c2

dθ

=

2πr v

−

2πr2 c2

ω

.

0

τ1

−

τ2

=

4πr2ω c2 .

(35) (36) (37)

6 Conclusions

In this paper some considerations about the Sagnac experiment have been made. It has been shown that, by considering the rotating metric and by imposing the cancellation of the line element, one has an unexceptionable explanation only from the mathematical point of view. In this way, it seems that the speed of light varies by c± ωr in one or the other direction around the disk. Instead, as it happens for example in Rindler or Schwarzschild metric, the apparent variation of the speed of light is a consequence of time dilation. For this reason, it seems that the physics of the experiment is clearer by using the "gravitational" Coriolis time dilation.

7 Acknowledgements
The Authors thank an unknown Referee for useful comments. This work has been supported ﬁnancially by the Research Institute for Astronomy and Astrophysics of Maragha (RIAAM).

References
[1] Newton I, Philosophiae Naturalis Principia Mathematica, Deﬁnitiones, Scholium, Imprimatur (S. PEPYS. Reg. Soc. PRAESES, LONDINI, 1686).
[2] Mach E, Die Mechanik in ihrer Entwicklung Historisch-Kritisch Dargerstell (Leipzig, Brockhaus 1883).

7

[3] Benedetto E and Feleppa F, “Underlining some mathematical and physical aspects about the concept of motion in general relativity”, Afr. Mat. 29, 349 (2018).
[4] Sagnac G, “Theorie nouvelle des phenomenes optiques d’entrainement de l’ether par la matiere”, Comptes Rendus 129, 818 (1899).
[5] Sagnac G, “The demonstration of the luminiferous aether by an interferometer in uniform rotation”, Comptes Rendus 157, 708 (1913).
[6] Fizeau H, “Sur les hypothèses relatives à l’éther lumineux”, Comptes Rendus 33, 349 (1851).
[7] Benedetto E and Feoli A, “Underlining some aspects of the equivalence principle”, Eur. J. Phys. 38, 055601 (2017).
[8] Licata I and Benedetto E, The Charge in a Lift. A Covariance Problem”, Gravit. Cosmol. 24, 173 (2018).
[9] Tamburini F et al, 2018 “Radiation from charged particles due to explicit symmetry breaking in a gravitational ﬁeld”, Int. Jour. Geom. Meth. Mod. Phys. 15, 07 (2018).
[10] Ashtekar A and Magnon A, “The Sagnac eﬀect in general relativity”, Jour. Math. Phys. 16, 2 (1975).
[11] Logunov A A and Chugreev Y V, “Special theory of relativity and the Sagnac eﬀect”, Sov. Phys. Usp. 31, 9 (1988).
[12] Rizzi G and Tartaglia A, “Speed of Light on Rotating Platforms”, Found. Phys. 28, 1663 (1998).
[13] Malykin G B, “Sagnac eﬀect in a rotating frame of reference. Relativistic Zeno paradox”, Phys. Usp. 45, 907 (2002).
[14] Rizzi G and Ruggiero M L, “The Sagnac Phase Shift Suggested by the Aharonov-Bohm Eﬀect for Relativistic Matter Beams”, Gen. Rel. Grav. 35, 1745 (2003).
[15] Rizzi G and Ruggiero M L, “A Direct Kinematical Derivation of the Relativistic Sagnac Eﬀect for Light or Matter Beams”, Gen. Rel. Grav. 35, 2129 (2003).
[16] Malykin G B, “The Sagnac eﬀect: Correct and incorrect explanations”, Phys. Usp. 43, 1229 (2007).
[17] Rizzi G and Ruggiero M L (Editors), “Relativity in Rotating Frames in Fundamental Theories of Physics”, Series, edited by A. Van der Merwe (Kluwer Academic Publishers, Dordrecht 2003).
8

[18] Ruggiero M L and Tartaglia A, “A note on the Sagnac eﬀect and current terrestrial experiments”, Eur. Phys. Jour. Plus 129, 126 (2014).
[19] Malykin G B and Pozdnyakova V I, “Quadratic Sagnac eﬀect - the inﬂuence of the gravitational potential of the Coriolis force on the phase diﬀerence between the arms of a rotating Michelson interferometer (an explanation of D C Miller’s experimental results, 1921 – 1926)”, Phys. Usp. 58, 4 (2015).
[20] Tartaglia A and Ruggiero M L, “The Sagnac eﬀect and pure geometry”, Am. Jour. Phys. 83, 427 (2015).
[21] Schwartz E, “Sagnac eﬀect in an oﬀ-center rotating ring frame of reference”, Eur. J. Phys. 38, 1 (2016).
[22] Schwartz E, “White light Sagnac interferometer - a common (path) tale of light”, Eur. J. Phys. 38, 6 (2017).
[23] Pascoli G, “The Sagnac eﬀect and its interpretation by Paul Langevin”, Comp. Rend. Phy. 18, 9-10 (2017).
[24] Gogberashvili M, “Coriolis Force and Sagnac Eﬀect”, Found. Phys. Lett. 15, 5 (2002).
[25] Corda C, “New proof of general relativity through the correct physical interpretation of the Mossbauer rotor experiment ”, Int. Journ. Mod. Phys. D 27, 1847016 (2018).
[26] Ashby N, “Relativity in the Global Positioning System”, Liv. Rev. Rel. 6, 1 (2003).
[27] Landau L and Lifsits E, -Classical Theory of Fields (3rd ed.). London: Pergamon. ISBN 0-08-016019-0. Vol. 2 of the Course of Theoretical Physics (1971).
[28] Landau L D and Lifshitz E M, Mechanics: Vol. 1 of: Course of Theoretical Physics), Butterworth-Heinemann 1976.
[29] Ridgely C T, “Forces in general relativity”, Eur. Journ. Phys. 31,4 (2010). [30] Misner C W, Thorne K S and Wheeler J A, “Gravitation” W H Feeman
and Company (1973).
9