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Dynamo theory and GFD
Steve Childress
16 June 2008
1 Origins of the dynamo theory
Dynamo theory studies a conducting fluid moving in a magnetic field; the motion of the body through the field acts to generate new magnetic field, and the system is called a dynamo if the magnetic field so produced is self-sustaining.
1.1 Early ideas point the way
In the distant past, there was the idea that the earth was a permanent magnet. In the 1830s Gauss analyzed the structure of the Earths magnetic field using potential theory, decomposing the field into harmonics. The strength of the dominant field was later found to change with time.
In 1919 Sir Joseph Larmor drew on the induction of currents in a moving conductor, to suggest that sunspots are maintained by magnetic dynamo action. P. M. Blackett proposed that magnetic fields should be produced by the rotation of fluid bodies.
The current consensus is that the Earths magnetic field is the result of a regenerating dynamo action in the fluid core. The mechanism of generation of the field is closely linked dynamically with the rotation of the Earth. Similar ideas are believed to apply to the solar magnetic field, to other planetary fields, and perhaps to the magnetic field permeating the cosmos.
1.2 Properties of the Earth and its Magnetic Field
The magnetic field observed at the Earths surface changes polarity irregularly. The nondipole components of the surface field also vary with time over many time scales greater than decades, and have a persistent drift to the west. The fluid core of the Earth is a spherical annulus, bounded by the solid inner core and the mantle. It is believed that the motion of the inner and outer core are sufficient to drive the geodynamo.
2
2 The homogeneous kinematic dynamo
The pre-Maxwell equations for a homogeneous moving conductor are
×B = µJ
×
E
=
∂B ∂t
J = σ (E + u × B)
(1)
∇·B=0
∇ · E = q/
Combined, these equations simplify to
∂B ∂t
×
(u
×
B)
η∇2B
=
0
(2)
where η = (µσ)1 is the magnetic diffusivity. This equation is called the magnetic induction equation.
2.1 Kinematic Dynamo Model of the Earths Core
Neglecting the inner core, the conducting fluid is contained in a sphere of radius r = rc. The exterior is regarded as free space. The equations are to be solved with a prescribed divergence-free (the core fluid is assumed incompressible) velocity field which is independent of time. On r = rc, the magnetic field is continuous owing to the absence of magnetic monopoles and a concentrated surface current layer. The magnetic field on r > rc also matches with an external vacuum magnetic field
Be = ∇φe.
(3)
The tangential component of
E = η∇ × B u × B
(4)
is also continuous at r = rc. We take the external field to decay like a potential dipole at r = ∞, i.e., B ≈ O(r3).
We pass to a dimensionless form using a characteristic length scale L, velocity scale U and time scale L/U . Using the vector identity
× (u × B) = B · ∇u + u ∇ · B u · ∇B B ∇ · u,
(5)
and since the velocity and magnetic fields are divergence free (∇ · u = ∇ · B = 0), the induction equation can be written in the form
DB Dt
1 R
∇2B
=
B
·
∇u
(6)
in terms of the material derivative
DB Dt
=
∂B ∂t
+u
· ∇B.
(7)
3
Here R is the magnetic Reynolds number, R = U L/η = U Lσ µ. For R << 1, the magnetic field diffuses easily through the conductor. For R >> 1, the magnetic field is frozen into the moving conductor. In this case, distortion and stretching of the field lines are caused by the term B·∇u. Notice that eq. (6) corresponds to the vorticity equation upon substitution of ∇ × u in place of B.
2.2 Kinematic Dynamo as an Eigenvalue Problem
For a given velocity field u, eq. (6), is linear for the magnetic field B, and we may separate
variables
B = eλt b(x), r < 1
B = eλt ∇φ, r > 1
(8)
Upon change of variable (8), the induction equation becomes
Lb
=
1 R
∇2b
u
·
∇b
+
b
·
∇u
=
λb
(9)
Here, length dimension L is L = rc. The values of λ allowing acceptable solutions b are the eigenvalues, and depend on R. We say u(x) is a (steady) kinematic dynamo if for some R > 0 there exists an eigenvalue λ(R) such that the real part of λ is greater than zero. Elsasser, Bullard, and others developed a theory of the spherical dynamo in this setting.
Note that although the kinematic equation is linear in B, the dynamo problem has a nonlinear character, since the correct velocity field u is not known a priori. Mathematically, we are trying to find the right function u(x) determining L, so that the dynamo property is realized. More generally, we might consider a time periodic x and an analogous Floquet problem.
2.3 Expansion in eigenfunctions
Consider the space of complex-valued divergence-free vector fields b(x) in r < 1, matching continuously with a potential field in r > 1. The eigenfunctions bn satisfy
L bn = λn bn, r < 1
(10)
bn = ∇φn, r > 1
and are continuous on r = 1. The eigenvalues are known to be discrete and countable, and the eigenfunctions are complete in the above space. If the eigenfunctions were known to be mutually orthogonal, in the inner product
(bm, bn) =
bm bn dV
(11)
R3
then, we would have
|B| =
e2 (λn)||bn||2
R3
n=1
(12)
Thus, if (λn) = 0 for all n the magnetic energy would be bounded by its initial value. This is the case for a normal operator on a Hilbert space, one which commutes with its adjoint.
4
However, the operator L is not normal so the energy is not a simple sum of decaying non-negative terms. In fact, substantial transient growth of field energy is possible even if u is not a dynamo. This complicates numerical proofs of the dynamo property. The dynamo problem is one of the best examples of non-normality, and the effects become especially pronounced in the limit of large magnetic Reynolds number R. In the case of the Earth, R is of the order 103.
2.4 Free-decay modes for a rigid spherical core
In can be shown that in R3, the following decomposition of a divergence-free vector field A
is possible
A = ∇ × (T r) + ∇ ×× (P r)
(13)
where T = T (r) and P = P (r) are scalar functions called the toroidal and poloidal com-
ponents of A, respectively (figure 1). Consider this decomposition for u = 0, so that we
have
1 R
∇2bn
=
λn
bn
(14)
The eigenfunctions bn are decomposed as follows:
bn = ∇ × (Tn r) + ∇ ×× (Pn r)
(15)
In the case of an axis-symmetric problem, one can express the eigenfunctions in terms of their components in spherical coordinates as follows:
bn
=
1 r
L2P
er
+
1 r
∂ ∂θ
∂ ∂r
rP
+
∂ ∂θ
T
(16)
where L2 is the surface Laplacian. If bn is expanded in spherical harmonics
∞l
bn =
bml f (r)Ylm(θ) eimφ
l=1 k=l
(17)
the surface operator has the property
L2 bn = l(l + 1) bn
(18)
The exterior of the dynamo is current free, and with the pre-Maxwell equation ∇ × B = µJ
one obtains ∇ × B = 0. In terms of eigenfunctions, the curl of the magnetic field can be
written
× bn = ∇ × (∇2(Pn r) + ∇∇ · (Pn r)) + ∇ ×× (Tn r) = ∇ × (∇2(Pn r)) + ∇ ×× (Tn r)
(19)
where we have used the identity ∇ ×× A = ∇∇ · A ∇2A. We reckon that the toroidal
component of the magnetic field is the poloidal component of the curl of the field, and similarly ∇2Pn becomes the toroidal component of the curl of the field:
(∇ × bn)T = ∇2Pn
(20)
(∇ × bn)P = Tn
5
Figure 1: Toroidal and poloidal field lines for a sphere rotating about the z axis.
Using eq. (16) and considering the poloidal and toroidal components of the curl of the field,
we obtain
1 r
L2Tn
=
1 r
l(l
+
1)Tn
=
0
(21)
so the toroidal field is zero at the exterior (Tn = 0, r > 1). Looking at the φ-component of
the field rotational, we have
∂ ∂θ
(∇2Pn)
=
0
(22)
Using the matching condition on the core boundary, one obtains ∇2Pn = 0, r > 1.
It then follows that we may consider separately problems for Tn and Pn
∇2Tn = λnTn ∇2Pn = λnPn
r<1
(23)
Tn = 0 ∇2Pn = 0
r≥1
Here Tn, Pn, ∂Pn/∂r are continuous on r = 1, and Pn O(r2) as r → ∞. The first few solutions are
T1
=
sin πr r
,
λ1 = π2,
(24)
where r = |x|, (this mode is not believed to be relevant to the Earths toroidal field except perhaps during reversals);
P1 =
π
cos r
πr
sin πr r2
cos θ,
r < 1,
P1
=
π
cos r2
θ,
r > 1,
(25)
(this is the basic dipole component of the Earths field with axis aligned with the rotation
axis);
T2 =
µ cos µr r
sin µr r2
cos θ,
λ2 = µ2 ≈ 20.2,
(26)
6
where µ is the first zero of the spherical Bessel function j1, given by tan µ = µ (this is a plausible dominant toroidal component of the Earths field).
2.5 The Omega Effect
An example of transient growth of magnetic energy in a non-dynamo is the so called Omega Effect, in which differential rotation causes deformation of poloidal field lines, which induce a toroidal field (figure 2). Let u = U (r)eφ, where r = x2 + y2 in cylindrical polars, and represent the magnetic field, taken as symmetric with respect to the z-axis, in the alternative poloidal-toroidal decomposition
B = B(r, z, t)eφ + ∇ × A(r, z, t)eφ.
(27)
Now assume A = rP determines the z-aligned dipole field and is independent of time. Taking the eφ components of the induction equation, B is then found to satisfy
∂B ∂t
+
r
∂A ∂z
∂ ∂r
U (r) r
1 R
∇2
1 r2
B = 0.
(28)
The second term here represents the omega effect - depending on U (r) it can act as a source term for the toroidal component B, and shows how the poloidal field is coupled to the toroidal field and can cause the latter to grow. This however is not enough to create a dynamo, as we shall see below. Note a velocity U (r)eφ is easily realized in a rotating sphere of fluid as a geostrophic flow.
3 Establishing the possibility of a homogeneous dynamo
3.1 A negative result: Cowlings theorem
Cowling (1934) argued that no homogeneous dynamo can exist for axisymmetric u and B. This is a result of the failure of the poloidal field to be maintained against ohmic dissipation. Taking
u = U (r, z, t)eφ + ∇ × ψ(r, z, t)eφ, B = B(r, z, t)eφ + ∇ × A(r, z, t)eφ, (29)
we find
∂A ∂t
∂ψ ∂z
1 r
∂ ∂r
(rA)
+
∂A ∂z
1 r
∂ ∂r
(rψ)
1 R
∇2
1 r2
A = 0,
(30)
∂B ∂t
+
r
∂A ∂z
∂ ∂r
U r
1 r
∂ ∂r
(rA)
∂U ∂z
r
∂ψ ∂z
∂ ∂
B r
+
1 r
∂ ∂r
(rψ)
∂B ∂z
1 R
∇2
1 r2
B = 0.
(31)
It is immediately clear from the equation for A that there is no coupling from the toroidal
field to the poloidal field, and that the poloidal field will inevitably decay. Multiplying this
equation for A by r2A and integrating by parts, one finds
d dt
r<1
1 2
(rA)2
dV
=
1 R
|∇(rA)|2 dV ≤ 0,
R2
(32)
7
Figure 2: The Ω effect: differential rotation causes the twisting of poloidal field lines which generates toroidal field.
and this implies that the poloidal field must necessarily decay over time. There are many such anti-dynamo theorems. The upshot is that although the velocity
field may be simple, the magnetic field must be fully three-dimensional. It is thus significant that the observed planetry and stellar magnetic fields exhibit non-axisymmetric components.
3.2 A necessary condition for dynamo action
Note that the existence or non-existence of dynamo action will depend upon the value of R = U Lσµ. The magnetic energy is
Em =
V
1 2µ
|B|2
dV,
(33)
and its rate of change is
µ
dEm dt
=
V
B
·
∂B ∂t
dV
= B · ∇ × E dV
V
(34)
= E · ∇ × B dV
V
= u · (B ×× B) 1 |∇ × B|2 dV.
V
σµ
8
For a dynamo to exist we need this rate of change of magnetic energy to be non-negative. Now if Um = maxV |u|, the we can write
u · (B ×× B) dV ≤ Um |B||∇ × B| dV
V
V 1/2
1/2
(35)
≤ Um |B|2 dV
|∇ × B|2 dV ,
V
V
using the Cauchy-Schwarz inequality. It is known that for a bounded homogeneous conductor V surrounded by vacuum there is a length LV such that, for any B in the space of realizable magnetic fields,
V
|∇ × B|2 dV
1 L2V
|B|2 dV.
R3
(36)
Thus we have
u · (B ×× B) dV ≤ UmLV |∇ × B|2 dV,
(37)
V
V
so
µ
dEm dt
=
UmLV
1 σµ
|∇ × B|2 dV.
V
(38)
This is negative if UmLV σµ < 1 in which case a dynamo cannot exist. Thus a necessary condition for dynamo action is that UmLV σµ ≥ 1. In particular dynamo action occurs as a bifurcation from the state of no magnetic field, as the magnetic Reynolds number is
increased.
3.3 The Bullard-Gellman computation
There was an early attempt to solve the eigenvalue problem utilizing direct expansion in the models of free decay of a spherical conductor. A steady velocity field was chosen as representative of rotating convection. The truncated system of modal equations produced a positive result, but in 1969 Gibbons and Roberts re-examined this choice of u and established that it was not in fact a kinematic dynamo. The original result was a numerical artifact.
3.4 Parkers model: The α effect
In 1955, Parker addressed the problem of producing poloidal field from toroidal field, to complement the omega effect. As we have seen, this is impossible if both the velocity field and the magnetic field are axisymmetric, but Parker envisaged averaging of the effects of small up-wellings within the core which could lift and twist poloidal field lines. The local magnetic Reynolds number was take to be large, so that the magnetic field was frozen into the fluid as it was lifted and twisted (figure 3). Under averaging, the twisted loops produced a mean current, aligned with the local toroidal field line. In this way the poloidal field can be induced from the toroidal field, thus completing the dynamo cycle and maintaining it against dissipation. This mechanism is now know as the α effect. Although Parkers supporting
9
Figure 3: Toroidal field lines are lifted and twisted by small scale non-axisymmetric components of the velocity field. This generates a mean current in the toroidal field direction which induces a poloidal field, and is termed the α effect.
calculations left many gaps, these have since been filled in and the model provides a crucial element of the dynamo cycle, breaking the constraints of Cowlings theorem.
If u = U (s)eφ, the induction equation in this model is written as
B = B(r, z, t)eφ + ∇ × A(r, z, t)eφ,
(39)
∂A ∂t
1 R
∇2
1 r2
A = αB,
(40)
∂B ∂t
+
r
∂A ∂z
∂ ∂r
U r
1 R
∇2
1 r2
B = 0.
(41)
The added αB term here is crucial and completes the α ω dynamo cycle.
3.5 Early examples of dynamo action
The Herzenberg dynamo (1958), comprises two solid rotating spheres of radius a embedded inside a larger sphere of radius R, with a R and a also small compared to the distance between the two spheres. Each sphere produces an ω effect determined by the local field at that sphere. The resulting induced field increases the local field at the other sphere, and regenerative dynamo action can result. Herzenbergs theoretical analysis of this system relies on the smallness of the embedded spheres and the geometrical decay of the induced field components, leading to a spatial filtering. Such a dynamo was realized experimentally in solid iron by Lowes and Wilkinson (1963).
Backus (1958) gave a proof of dynamo action for a kinematic dynamo in a homogeneous spherical fluid conductor based upon temporal filtering of magnetic decay modes. This involves applying a velocity field u1(x) for time 0 < t < T1, and then setting u = 0 for time T1 < t < T2, during which time the magnetic field decays, filtering out modes with the faster decay. A new velocity field u2(x) is then applied for T2 < t < T3 and then u = 0 again. This sequence of applying velocity fields and then setting u = 0 to filter out fast decaying modes is then continued.
If the basic mode (involving the slower decaying poloidal and toroidal components) is D with ||D|| = 1, an initial magnetic field involving this basic mode with amplitude A, plus
10
some arbitrary magnetic noise N(0), with ||N(0)|| ≤ for some > 0, is
B(x, 0) = AD(x) + N(0).
(42)
If it can then be shown that at time t = T2N the magnetic field has the form
B(x, T2N ) = AN D(x) + N(T2N ),
(43)
where |AN | ≥ |A| and ||N(T2N )|| ≤ , then dynamo action occurs. Thus the noise gets no bigger, and the basic field is at least maintained.
3.6 Smoothing Applied to the Kinematic Equation
The smoothing method consists in splitting the dynamo kinematic equation operator
LB
=
∂ ∂tB
−∇
×
(u
×
B)
η∇2B
=
0,
(44)
and the velocity and magnetic field into some rough and smooth components:
u = uS + uR,
B = BR + BS,
L = LR + LS,
(45)
LR B = −∇ × (uR × B),
LS
B
=
∂ ∂tB
×
(uS
×
B)
η∇2B.
Let P be a projection onto smooth fields (P 2 = P ), such as
P B = BS
(46)
and assume P LS = LS P . Subtracting P L from L, one gets
(LR P LR)B = (LS P LS)B = LSB LSBS = LSBR
(47)
The smooth projection of (LR P LR)B is
P (LR P LR)B = P LR P 2LRB = P LR P LRB = 0
(48)
so (LR P LR)B is a rough field. Assuming that LS can be inverted on rough fields, we
have
BR = LS 1(LR P LR)B ≡ M B
(49)
So, one has
B BS = BR = M B
(50)
or, if I M is invertible on smooth fields, we obtain B in terms of its smooth component,
B = (I M )1BS
(51)
11
Thus, one can write
P L B = P (LS + LR)B = LSBS + P LR(I M )1BS = [LS + P LR(I M )1]BS = 0
(52)
and it can be shown by substitution that if BS satisfies
[LS + P LR(I M )1]BS = 0
(53)
then B = (I M )1 BS solves LB = 0. The smoothing method can be used to treat analytically the creation of the α-effect.
3.6.1 First-Order Smoothing
Assuming that LRBS is a rough field such as P LRBS = 0, one can make the following approximations
0 = [LS + P LR(I M )1]BS ≈ [LS + P LR(I + M )]BS = [LS + P LR M ]BS. (54)
Here, we have
LS
BS
=
∂ ∂t BS
×
(uS
×
BS )
1 R
∇2
BS
(55)
and
P LR M BS = P [LRLS 1LR] BS ≈ P LR BR
(56)
with BR a linear function of BS. This is the basis of mean field electrodynamics developed by Krause, Radler and others in the 60s.
For example, set uS = 0 and let uR be a real steady solenoidal field of the form
uR =
ak eik.x
k∈K
(57)
where K is all 3-vectors excluding the zero vector. If BS is large scale relative to uR, then
×
(uR
×
BS
)
=
1 R
∇2BR
(58)
implies
BR = R i
k2 k · BS akeik·x,
(59)
k∈K
and
P [uR × BR] ≈ R i
k2(a × ak)BS · k ≡ α · BS.
(60)
k∈K
It can be shown, by using the substitution ak = k × bk, that α is real and symmetric. For isotropic uR, of this form we may assume αij = αδij where
α
=
1 3
R
i
k2(ak × ak) · k.
(61)
k∈R
12
If all k have unit length we see that
α
=
R 3 uR
·
(∇
×
uR),
(62)
involving a spatial average of the helicity density uR · (∇ × uR) of the velocity field. A field satisfying all the above conditions is the Beltrami field (in which u is parallel to ∇ × u)
uR = (sin z + cos y, sin x + cos z, sin y + cos x),
(63)
with α = R/3. The role of helicity is reminiscent of Parkers upwellings, which involved a rising, twisting flow.
3.6.2 Spatially periodic kinetic dynamos
This is a setting where complete analysis of the smoothing method may be carried out
explicitly, with or without time dependence. Considering here only steady fields, the real
velocity field has the form
u = uR =
akeik·x
(64)
k∈K
The admissible magnetic fields have the complex form
B = ein·x
Bkeik·x, |n| < 1
k∈K +(0,0,0)
(65)
so B0 = BS (the components for k = 0 are all rough). Kinematic dynamo action can be defined by growth of field if n is sufficiently small. This is the palindromic so many dynamos theorem (G. O. Roberts): almost all such u are kinematic dynamos.
3.7 Braginskiis theory for nearly axisymmetric dynamos (1964)
Braginskii used a smoothing technique for nearly axisymmetric flows to derive the α effect. Here, the smooth parts of the variables are the axisymmetric components, and the rough parts are the non-axisymmetric components. The smoothing operation is therefore an angle average over φ in cylindrical polar coordinates. Motivated by the fact that the magnetic Reynolds number R is large for the Earth and that the field is dominated by a dipole aligned with the rotation axis, Braginskii considers expanding the fields in powers of = R1/2;
u = U (r, z)eφ + u + 2uP ,
(66)
B = B(r, z, t)eφ + B + 2BP ,
(67)
where < u >=< B >= 0 where < · > means an angle average. The relevant timescale is shorter, so writing τ = 2t, the order terms in the induction equation give
∂B ∂τ
+
ruP
·
B r
= rBP · ∇
U r
+ (∇ × E)φ +
∇2
1 r2
B = 0,
(68)
13
where E =< u × B >. If BP = ∇ × A(r, z, t)eφ, we also find
∂A ∂τ
+
ruP
·
A r
= Eφ +
∇2
1 r2
A.
(69)
Braginskii found that the contributions from E can be mostly absorbed into effective variables, denoted with a superscript e:
∂B ∂τ
+
rueP
·
B r
= rBP · ∇
U r
+
∇2
1 r2
B = 0,
(70)
∂Ae ∂τ
+
rueP
·
Ae r
= αB +
∇2
1 r2
Ae.
(71)
The term which cannot be absorbed gives rise to the α term, and in effective variables these equations are identical to the Parker model, the toroidal field exhibiting the α effect.
3.8 Sowards Lagrangian analysis of Braginskiis problem
The same situation of a nearly axisymmetric flow was analysed in a slightly different way by Soward (1972). The key idea of this method is to make use of an invariance of the induction equation for the diffusionless case R = ∞;
Bt + u · ∇B = B · ∇u.
(72)
Consider two (prescribed) velocity fields u(x, t) and u˜(x˜, t), and the Lagrangian variables x(a, t) and x˜(a, t) for these flows defined by
dx dt
a
=
u(x, t),
dx˜ dt
a
=
u˜(x, t).
(73)
Then
u˜i
=
∂x˜i ∂t
+
x
∂x˜i ∂xj
uj
.
(74)
The solutions to the induction equation for the two flows are
Bi(x,
t)
=
Bj (a,
0)
∂xi ∂aj
,
B˜i(x˜,
t)
=
B˜j
(a,
0)
∂x˜i ∂aj
.
(75)
Using the chain rule
∂x˜i ∂aj
=
∂x˜i ∂xk ∂xk ∂aj
(76)
we obtain
B˜i
=
∂x˜i ∂xk
Bk
(77)
Now the idea is to consider one of the velocity fields as including the rough components
while the other is the smooth velocity field without these rough components. For the Bragin-
skii problem this means taking the tilde variables to include non-axisymmetric components
of order , while the x variables do not include these. The x variables will therefore not be
14
physical. We seek a near identity transformation x(x˜, t) = x˜ + O( ) of R3 which eliminates the O( ) in the velocity, so that
u(x, t) = U (r, x)(1 + O( 2))eφ + 2ueP (x) + 2u (x, t) + o( 2).
(78)
The equations in x space can be angle averaged, and this results in Braginskiis result (70) and (71) with A(x, τ ) in place of Ae(x˜, τ ). The α effect is missing - it comes from the noninvariant diffusive term. The effective variable Ae occurs when we transform the unphysical x variables back into the real physical space x˜.
The key point is that, by including the non-invariant diffusive term in this analysis, one
obtains the α effect term in (71), along with terms which can be absorbed into effective
variables.
4 Some examples of analytically accessible dynamos
There are some simple velocity fields for which dynamo action is known to occur. The Ponomarenko dynamo is a flow in a cylinder in which the fluid travels axially while rotating,
u = U (r)ez + rΩ(r)eφ
(79)
The magnetic field is periodic in z,
B = b(r)eλt+imφ+ikz .
(80)
This can be analysed for large R. The dynamo mechanism here involves the Ω effect
which maintains the toroidal field from the poloidal field, and diffusion which maintains the
poloidal field from the toroidal field.
Another simple dynamo is the Roberts cell, which like the Beltrami flow is periodic in
two dimensions
u = (cos y, sin x, cos x + sin y).
(81)
By transforming the variables x → x y, y → π/2 + x + y, the Roberts cell takes the form
u = (cos y sin x, cos x sin y, 2 sin x sin y)
(82)
An illustration of this flow and the generation of magnetic field is shown in figure 4.
5 MHD dynamos
So far we have only talked about kinetic dynamo theory, when the velocity field is somehow prescribed and unaffected by the magnetic field. In magnetohydrodynamics the velocity and magnetic fields both interact with each other and some physical mechanism (such as convection) which drives the fluid velocity must be included. The momentum equation for the fluid in a rotating frame with angular velocity Ω includes the Coriolis force and the Lorentz force,
ρ
Du Dt
+
∇p
+
2ρ
×
u
+
1 µB
×
(∇
×
B)
ρν∇2u
=
cg.
(83)
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Figure 4: The Roberts cell with a z periodic field applied. The flow causes the production of z periodic y-field from x-field, and vice versa.
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Figure 5: Magnetic field from a numerical MHD simulation of the Earths core by Glatzmaier and Roberts.
The motion here is assumed to be driven by convection of some scalar c (temperature or
composition, for instance),
Dc Dt
Dc∇2c
=
Q.
(84)
If the convective forces are absent, and the velocity is axisymmetric, but the alpha-effect
is included as in Braginskiis model, and the normal component of u vanishes at the core
boundary, it is found that such an axisymmetric dynamo cannot be sustained in MHD.
The microscale driving needed to produce the small scale fields associated with an alpha
effect can not sustain the dynamo. The Earths dynamo is now believed to be a result of
larger scale driving as a result of thermal and compositional convection associated with the
formation of the inner core.
Figure 5 shows a numerical simulation by Glatzmaier and Roberts, of a convective model
of the Earths core. This simulation exhibits the observed full reversals of the magnetic field
on timescales of geophysical relevance. The role of the inner core is established as a reservoir
of magnetic field during these reversals.
References
[1] E. C. Bullard, The Origin of the Earths Magnetic Field, Observatory, 70 (1950), pp. 139143.
[2] T. G. Cowling, The Magnetic Field of sunspots, Monthly Notices R. Astron. Soc., 94 (1933), pp. 3948.
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[3] T. G. Cowling, Magnetohydrodynamics, Interscience Publishers, London, 1957. [4] W. M. Elsasser, Hydromagnetism. I. A Review, Am. J. Phys., 23 (1955), pp. 590
608. [5] M. Ghil and S. Childress, Topics in Geophysical Fluid Dynamics: Atmospheric
Dynamics, Dynamo Theory, and Climate Dynamics, Springer-Verlag, New York, 1987. [6] H. K. Moffatt, Magnetic Field Generation in Electrically Conducting Fluids, Cam-
bridge University Press, 1978. [7] E. N. Parker, Hydrodynamic Dynamo models, Astrophys. J., 122 (1955), pp. 293314. [8] E. N. Parker, Cosmical Magnetic Fields, Calrendon Press, Oxford, 1979. [9] G. O. Roberts, Spatially periodic dynamos, Phil. Trans. R. Soc. A, 266 (1970),
pp. 535558. [10] P. H. Roberts, An Introduction to Magnetohydrodynamics, Americal Elsevier Pub-
lishing Company, New York, 1967. [11] P. H. Roberts, Dynamo Theory, vol. 2, American Mathematical Society, Providence,
RI, 1971, pp. 129206.
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