Derivation of Maxwell's equations

Derivation of Maxwell's equations

de Groot, S. R. Vlieger, J . 1965 Physica 31 254-268 DERIVATION THE STATISTICAL OF MAXWELL’S THEORY EQUATIONS OF THE MACROSCOPIC EQUATIONS by S...

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de Groot, S. R. Vlieger, J . 1965

Physica 31 254-268

DERIVATION THE STATISTICAL

OF MAXWELL’S THEORY

EQUATIONS

OF THE MACROSCOPIC

EQUATIONS

by S. R. DE GROOT Instituut voor theoretische fysica, Amsterdam, Nederland

and J. VLIEGER Instituut-Lorentz,

Leiden, Nederland

Synopsis The macroscopic field

Maxwell

equations

are derived

equations”.

equations

in covariant

way from the “atomic

The latter were themselves obtained previously from of electron theory for point particles, by means of a covariant

the field multipole

expansion. In the statistical derivation an appropriate averaging procedure is used in a so-called “fluxion space”, i.e., the space spanned by the atomic positions, the atomic multipole moments and the first and higher time derivatives of these variables, on which the fields may depend. Retardation of the fields is also taken into account.

$ 1. Introduction. Lor en t zl) derived Maxwell’s equations for material media from the field equations of electron theory by averaging over macroscopically small space regions, and by introducing at the same time the electric and magnetic polarization vectors. These vectors were obtained by analyzing the amounts of charges and currents passing through the boundaries of a volume element. M azur and N ij b o er 2) replaced this derivation by a statistical ensemble averaging method in phase space. In this paper we shall use a different statistical method and compare it with previous procedures in $ 9. It will allow us to derive the Maxwell equations; we shall, in contrast with the authors mentioned, define the electric and magnetic polarization in a covariant way. Our derivation consists of two steps. First, by an appropriate multipole expansion, we have obtained in a previous papers) the “atomic field equations” from the fundamental field equations of electron theory, valid for point particles. These atomic field equations contain the electromagnetic field tensor, the atomic chargecurrent density vector and the atomic polarization tensor (I 2). These are all dynamical quantities, which depend on the atomic positions and multipole moments, and besides on first and higher time derivatives (“fluxions”) of This research was supported in part by the Office of Aerospace Research, United States Air Force, through its European Office.

-

254 -

DERIVATION

OF MAXWELL’S

EQUATIONS

255

these (9 3). This particular character must be taken into account in the definition of macroscopic averages (5 4) by means of distribution functions in what we shall call “/Z&on space”, spanned by the atomic positions, multipole moments and their various order time derivatives as coordinates. The retardation of the fields will also be taken into account (5 5). The conservation of particles leads to a lemma according to which space and time differentiations commute with averaging in fluxion space (9 6). Finally this lemma permits us to derive the Maxwell equations from the atomic equations ($57, 8). The plasma and the averaged Lienard-Wiechert potential are discussed in appendices. 3 2. The atomic field equations. The fundamental equations of “electron theory” are valid for an electromagnetic field produced by a system of (spinless) point particles (electrons or nuclei). We assume that these point particles are grouped into stable atoms, molecules or ions (which may even be free electrons only). We shall refer to these groups as “atoms” *). For simplicity’s sake we consider in this paper identical atoms, but the formalism can be generalized easily to mixtures. By means of a multipole expansion in powers of the internal coordinates of the atoms, one can obtain the “atomic field equations” from the fundamental field equations of electron theory. If this is done in a covariant way, one findss) _

-doe

V-b = 0,

(1)

dab + V A e = 0,

(2)

V-e = p -

(3)

Vep,

+ V A b = i/c + dop + V

A

m.

Here e and b are the microscopic electromagnetic fields, atomic charge and current densities, defined as

(4 p

and i are the (5)

i =

x

e&k

k

d(Rk- R),

(6)

where ek is the atomic charge, Rk the position of the atom as a whole, & the atomic velocity and R the reference point of observation. The quantities

*) It is possible, and under certain circumstances sub-units of the systems).

useful, to choose still other stable groups as

256

S. R. DE GROOT

AND

J. VLIEGER

p and m form the polarization tensor, defined up to second order by

P = x {%c~@lc k

m

=

z

{ak’vk

-

qk’%‘V)

pk

A (pk

+

+

Pk

A vk

qk’fik’v) do(Pk

-

dO(~k’qk*~kJ’k)

‘Pkykyk) d(Rk

-

R),

(7)

d(Rk

-

R),

(8)

$_ A qk’akyk)

‘Pkrk}

where pk, qk and vk are the atomicelectric dipole and quadrupole and magnetic dipole moments, all defined in a momentary Lorentz frame in which the atom is at rest. Furthermore Pk E &k/C, yk = (1 - ,@)-*

(9)

and Qk

=

u +

(41

-

/f$ -

1) /-?kPk//$,

(10)

with U the unit three-tensor, are functions of the atomic velocity. The time and space differentiations do = d/d& V = dldx, dldy, d/dz

(11)

are total derivatives in the sense that the fields and polarizations do depend not only explicitly on time t and space coordinates R but also implicitly, because the atomic quantities of which they are functions may themselves also depend on t and R. 3 3. Retarded dynamical quantities. The fields at a point R at time t are superpositions of fields produced by the single atom k. The fields produced by atom k at the space-time point (R, t) will according to (l)-(1 1) depend on a number of independent quantities: the atomic position Rk, the atomic multipole moments pk, qk and vk, and also first and higher time derivatives of these. Let us introduce a special notation for the time derivatives (for which we shall use Newton’s term “flzcxion”) ; for instance Rp)(tk)

= dn&(tk)/dt;,

(12)

and similarly for the internal coordinates (the multipole moments pk, qk and vk), which for brevity we shall call symbolically Ek.Now we can say that the fields will depend on position Rk z Rio), velocity Rg’, acceleration Rk”, and on tk and fluxions of it. All these quantities have to be taken at the retarded time tk = t - Tk. The retardation time 7k is the time needed for a signal travelling from the atom at position R,lo) to the reference point R with the speed of light. It is therefore given by IR -

Ri”‘(t -

Tk)] = cTk.

(13)

From this equation the retardation time 7k:can be found as a function of

DERIVATION

OF MAXWELL’S

257

EQUATIONS

R and t if the trajectory RfdO)(tk)of the atom is known. With this solution ok = T~(R, t) substituted, formula (13) becomes an identity in R and t, to be used below. Let us consider the retarded one-particle dynamical quantity Crk,depending on the position Rho’, the fluxions Rg’, Riz’, . .., R$‘, the internal parameter EL” and its fluxions, and also explicitly on R and t: Crk= a[Rh”{t -

tk(R, t)}, . . . . Rp’{t - q(R,

t)}, &“{t - Tk(R, t)}, . . ., @‘{t

Tk(R, t)}; R, t].

-

(14

In calculating time and space derivatives of (14) one must take both the implicit and explicit time and space dependencies into account. The total time derivative of (14) is (15)

with dRg) _++“(l

!&5i,:++

_$),

dt

_?.?>.

(16)

By differentiation of the identity (13) with respect to t one finds 1

1 _

aTk --IcZ

Rg’.(R

at

-

c IR -

R&O’) -1

(17)

Rio’1

for Rio) # R. It has to be taken equal to unity if Rho) = R. (We shall always tacitly assume that in the latter case (17) has to be replaced by unity.) Substituting this result into (16) we find Rir’. (R _ Rp’)

dRp’

-=

dt

c IR -

-1

Rio’1

(18)



and d@’

p=

@+I)

dt

Ril’.

1_

(R _ Rio’)

-1

c ]R - Rio’1

I

(19)



Similarly for the total space derivative one has (20) with d dR

-R’+

_%

aR

Rt+r’,

d&@

hk

dR

aR

-=_-

,g+1,*

(21)

From the identity (13) it follows that aTk

-= aR

R c [R -

Rio’ Rio’]

1

-

Ril). (R _ R’$‘)) c

IR -

Rio’1

-1



(22)

258

S. R. DE GROOT

AND

J. VLIEGER

if Rio) # R, but zero if R,co) = R. (Again we shall tacitly assume that (22) vanishes for the latter case.) From the last two equations we find d _Rj&‘= dR

_

R c

Rk”’

R(S+i) 1 _

IR- Rio'1k

Rjj'+(R - Rio') -1 c IR- Rio'1

(23)

and d@ -=dR

R - Rio' c IR - Rio'1

RF’.@

_

Rjf’)

-

c

IR- Rio']

-1.

(24)

The formulae (15) and (20) have thus been found for the retarded quantities. The non-relativistic case is obtained by omitting the retardation in these expressions. In (20) only the last term survives then, because Rgfand &!’ do not depend on R,when 7k is zero. 9 4. Macroscopic qzcantities. The problem of how to obtain the (macroscopic) Maxwell equations from the atomic field equations involves first of all the problem of how to define macroscopic quantities. This will be done in the same way as elsewhere in statistical physics, namely by averaging over a number of particles in a volume, which is macroscopically infinitesimal, but which still contains a sufficient number of particles, that the principles of statistical mechanics can be applied to them. This is the same procedure as used in kinetic theories to obtain the macroscopic equations of hydrodynamics, heat conduction and diffusion, or in general non-equilibrium thermodynamics4) 5). The macroscopic values of the dynamical quantities, such as the fields are then found by averaging the atomic fields over their arguments (the independent variables Rio', Rf ‘, ...,EL'), lf', ...of the atoms k) in a certain volume. At the same time we also have to take into account the retardation of the fields. We shall therefore (in 5 5) have to describe the averaging process by means of retarded distribution functions, defined in the space of the variables mentioned above, which we referred to as “fluxion space”. In this way one obtains macroscopic dynamical quantities which are continuous functions of space and time coordinates from averaging over microscopic quantities which contain singularities. 5 5. Averages in flmion space with retarded distribzction functions. We saw in 8 3 that the relevant physical quantities, such as the electromagnetic fields, are sum functions a = x:tEk of one-particle dynamical quantities Crkof the form (14). They depend on the retarded values of the atomic (‘) and time derivatives of these positions Rio), the atomic multipole moments Ek variables. As explained in the preceding section we are interested in certain average values of these dynamical quantities. In view of defining these averages we shall introduce appropriate distribution functions. In order

DERIVATION

OF MAXWELL’S

259

EQUATIONS

to take retardation

into account, let us in the first place in the three-dimensional configuration space Rio’ imagine a sphere which shrinks with the speed of light in such a way that it arrives at the point R at time t. We introduce now a probability distribution fret such that t) dRi”’ . . . dRp’

d&O’ . . . d5im”’

(25)

gives the number of atoms which the contracting sphere encounters with m) in the interval (R,(8) _ 4 dRj$ Rp’ + 4 dRp’) values of Rt)(s = 0 1 and tI&’ (s =O, 1, . ..., A) in’(lk(*) - 4 d@‘, EI&’+ 4 d@). With the help of this “retarded distribution function” in the “fluxion space”, spanned by Rio’, . . ., R’$‘, &” I a-., 6irn),the retardation of a dynamical quantity a = & Uk is correctly taken into account when calculating its average value = / . . . /cr(RiO’, . . . . Rp’, &“, . . . . @“‘;

R, t)

fret(Rio), . . . . RII”‘, &“, . . . . E(l”‘lR, t) dRi”’ . . . dRII”’ d&O’ . . . d$“?

(26)

Since the distribution function describes the averaging procedure of $4, the quantity
can be considered as the (retarded) macroscopic quantity A (R, t), corresponding to the microscopic dynamical quantity a. It should be noted that the tensor character of a is not changed by the averaging procedure (26). The reason is that fret dRi”’ . . . dEim)is an invariant, namely a number of particles encountered in a volume element by a light wave front. Therefore A has the same transformation properties as a. $ 6. A lemma: time and space differentiations commzlte with averaging in fluxion space. From the conservation of particles we shall derive a lemma, which will allow us to obtain the Maxwell equations from the atomic equations by means of averaging in fluxion space. If the average is looked upon as a sum, then the content of the lemma is essentially the fact that differentiation and summation commute. Since we have written averages as integrals over retarded distribution functions in fluxion space, we wish to prove here the lemma in the language of this formulation. This procedure will then also permit us to incorporate the particular aspects of electrodynamics into the formalism. Let us consider first the time derivative (at constant R) of a mean dynamical quantity, averaged in fluxion space, taking into account retardation. Then we have, with (26), a

at

a

= at

s

a(Ri’),

. . . . Rjlt’; R, t) fret(RLO), . . . . R$?‘jR, t) dVn,

(27)

where for brevity’s sake we have not written the internal quantities &‘), . . . , $f@ (which should be treated exactly as the quantities Rio’, . . . . Rc’) and

260

S. R. DE GROOT

AND

1. VLIEGER

where dVm is the volume element in fluxion space. We can write (27) as

s

{a(Rp, .

-

..)

Ri?;

R, t + dt) fret(R&‘), . . . . RP’IR, t + dt) -

cz(RiO),. . . , R(I”‘; R, t) fret(Rio), . . ., RP’IR, t)) dlrn.

(28)

The conservation of particles will now give us a relationship between two distribution functions at times t + dt and t. In fact a wave front (as described in the preceding section) which arrives at the point R at time t + dt encounters in the volume element dT/n around the point Rio), . . . . Rp’ a number of atoms equal to fret(Rio), . . ., Re)IR, t + dt) dVfi. These same particles are also met by a wave front arriving at R at time t. They are encountered in a volume element dV+ around the point Rio’ - (dRi’)/dt) dt, . ..) R$’ - (dRf’/dt) dt for a given fixed value of the variable Rp+l’. The point is that the time derivatives appearing here are given by (18) as functions of Rio’, . . ., Re’ and Rp+l’, where Rpf’) has to be considered as an independent variable, because the variables Rh’) and higher derivatives are not functions of Rio’ and Ril’ (not even of positions and velocities of all particles in electrodynamics). Now the number of particles with values of Rc+” in a fixed interval dRp+r) met by the wave front arriving at R at time t in dV+ is equal to

fret{Rio) -

(dRi”/dt)

dt, . . . . Rp’

-

(dR(lt’/dt) dt,Rp+l’IR,

t} dVn- dRp+?

To obtain again the number of all particles considered we must integrate over R&?+l) since its value is arbitrary. Therefore conservation of particles can now be written as fret(Ri’),

. ..I R$‘IR >t + dt) dVn = dRjlZ’

, . . . . R$’ _ -

dt

dt, Rp+l’l R, t) dV@- dRp+l).

&CR+‘,

(29)

As explained above we had to introduce a distribution function in a fluxion space of higher dimension, because of our ignorance of the higher derivatives at given Rio) and R,(l) . It is connected to the original distribution function of lower dimensionality by the relation

fret($‘),

. . . . RII”)IR,t) =/fret(Rio),

. . . . Re+l’IR,

t) dR$+?

(30)

Let us now introduce (29) and (30) into the first and second term at the rightIf we also change variables in the first hand side of (28) respectively. integral from R,lo) - (dRiO)/dt) dt, . . . . R$$ - (dRp’/dt) dt, R$+l) to Rio’, . . . . Rp+l’, we finally obtain dRi”’

Rio’ + dt -

dRim’

dt, . . . . RII”’+ dt

cr(RiO’,. . . . R,$? R, t) f,,t(Ri”,

. . . . R$+l’\R,

dt; R, t + dt

t) dV/‘“+l.

(31)

DERIVATION

OF MAXWELL’S

261

EQUATIONS

With (15) this becomes

a
___ at which, according

1% fret(R$', ....Rfi”+l’l R, t) dVn+i,

to the definition a(a) -=-. at

This is the lemma according dynamical quantity is equal fluxion space. In an analogous way the Conservation of particles is arriving at two points R and

(26) of average values, gives the result da

( dt >

(33)

to which the time derivative of an averaged to the average of its total time derivative in lemma can be derived for space derivatives. now expressed with the help of wave fronts R + dR at the same time t:

. . -> RP’IR + dR, t) dV” =

fret(Ri”)t =

(32)

d

f *et ( Rio’ - dR . __dR Rio’, . . . . Rp’ -

s &‘“+I)

dR.--- d dR

Rc’, Rp+l’lR,

dVn- dRp+l’,

t

> (34)

with dVn- the volume element around the point Rio) -

dR . (d/dR) RL”), . . . . R(a) - dR. (d/dR) R,(%).This relation leads with (20), (26) and (31) to k a(a) -=

aR

-

da

( dR > ’

(35)

which is the lemma for space differentiation. $7. Derivation of the Maxwell equations. The atomic field equations (l)-(4) contain the microscopic electromagnetic fields e and 6, the atomic charge-current density vector (5), (6) and the atomic polarization tensor (7), (8). The electromagnetic fields are sum quantities of retarded dynamical variables of the kind (14). The other quantities are not retarded, but they can equally well be considered as retarded quantities, by writing the nonretarded delta-function d(R Lo’- R) as the retarded quantity (1 -

Ril’.(R

- Rh”)/c IR - R~“‘j}-ld(R~o’ - R).

If we take the averages of (l)-(4), we can therefore directly apply the lemma (33), (35), because averages of total time and space derivatives in fluxion space occur. Let us introduce the notations

E(R, t) = + Ee, B(R, t) = (6) + Be

(36)

262

S. R. DE GROOT

AND

J. VLIEGER

for the macroscopic fields (Ee(R, t) and Be(R, t) are external fields which satisfy the Maxwell equations without source terms), e(R, t) =

,I(R, t) =

(37)

for the charge-current density, P(R, t) =

, M(R, t) = Cm>

(38)

for the polarization tensor and a0 =

alact,o = a/ax, alay, ala2

(39)

for the time and space derivatives. From (l)-(4), with the help of the lemma (33), (35), we obtain now the macroscopic equations V.B = 0, (40) aoB + V A E = 0, (41) V-E = Q - V.P,

(42)

--aoE + V A B = I/c + i&P + V A M,

(43) which are Maxwell’s equations. They have manifestly the same form and covariance properties as their atomic counterparts. We may notice that, although the charge-current density vector and the polarization tensor are found here as retarded averages of quantities containing the function (1 -

Rjj’. (R -

Rp)/c

IR -

RpI}-ld(Rp

-

I?),

they are simply equal to the averages of the expressions (5), (6) and (7), (8), containing 6(R,(O)- R), with “ordinary distribution functions”. As a matter of fact it can be shown (appendix I) that the following relation exists between retarded and ordinary distribution functions: fret(Ri’),

..-,

Rf’, E&O’, . .., lbm’IR, t) = f(

1

1-

Rf’.(R - Rho’) c ,R _ Rio’,

R’o’ k > ***, Rj‘?‘, tie’ , *a*,&m’., t -

\R - Rio’1 c

>

*

(44)

where f(Ri”‘, . .., Rp’, [Lo’, . . ., lim); tt) is the ordinary distribution function for the system, which is defined by writing the number of atoms in the volume element dRi”’ . . . dRp) d5i”’ . . . d.@’ around the point Rjf’, . . . . Rp’, go, k , . . ., tirn’ in fluxion space at the time tk as: f(Ri”), . . . . Rp’, lie’, . . . . @“‘;

tk) dRi”’ . . . dRII”’ d$”

. . . d@‘?

(45)

The factor between curly brackets in (44) also appears in the denominator of { 1 - RF). (R - Ri”))/cIR - Rr)I}-l d(Rf) - R). Therefore, if we average this quantity with a retarded distribution function, we get the same result as by averaging d(R,co)- R) with an ordinary distribution function.

DERIVATION

OF MAXWELL’S

263

EQUATIONS

An alternative form of equations (42) and (43) is obtained when the field tensor D=E+P,H=B-M (46) is introduced*). Then (42) and (43) can be written as V-D = Q,

(47)

-aaoD + V A H = I/c.

(48)

The quantities (37) and (38), and therefore also (46) contain (ordinary) averages over (5), (6), (7) and (8). We shall discuss a few aspects of the Maxwell equations, involving these averages, in the next section. The lemma also permits to derive macroscopic charge conservation from microscopic charge conservation (appendix II). 3 8. On special forms of the Maxwell equations. The Maxwell equations (40)-(43), as well as the atomic field equations (l)-(4), were written with a polarization tensor developed up to second order in the internal coordinates. Then one has as atomic multipoles: the electric dipole moment pk, the electric quadrupole moment qk and the magnetic dipole moment vk, which appear in the expressions (7) and (8). However, one can also choose to classify the terms of the polarization tensor according to their multipole order, and study, for instance, the case of the dipoles only 3). Then (38) with (7) and (8) has the form p =
(ak'pk

+

Pk * vk)d(Rk

-

R)>,

(49)


Pk A pk)d(Rk

-

R)>.

(50)

k M=

The polarization (49) contains a part arising from the motion of magnetic moments, which does not occur in non-relativistic theory (see $9). One notices that the forms of both P and M are affected by the atomic velocity . Rk = pkc.

If all atomic velocities tik are equal, say to /?c, we obtain for (49) and (50), p = fi.
pkd(Rk

~*<;vk~(& k

-

-

R))

+

p*


R)>

-

p A
-

R)>,

(51)

-

R)),

(52)

because s2 =

u+

(%Q - j!?s-

1) p/3/p”

(53)

is now a constant quantity. These formulae may be applied to the case of a conductor with a rigid ion lattice. (Note that the arbitrarily moving con*) The fields E, B, D and H are thus defined in a general theoretical

way as averages

scopic quantities. Since they satisfy the Maxwell equations, one can derive “operational” definition of these fields, as measured in certain cavities.

from

of the micro-

these the

usual

264

S.

R. DE GROOT

duction electrons do not contribute and vk = 0.)

AND

J. VLIEGER

to P and M because they have pk = 0

$ 9. Discussion of previous work. Relativistic theories in which it was tried to derive the Maxwell equations from the microscopic field equations were given by Dgllenbachy), Kaufmans), Bacryg) and Nyborglo). Dgllenbach stressed the desirability of expressing the polarization tensor in terms of the atomic multipole moments in a covariant way. (In this paper (38) with (7) and (8).) He gave, however, only approximate formulae, involving the dipole moments. His equations, expressed in terms of microscopic quantities, are then no longer covariant. Kaufman and Bacry give a multipole expansion, which is based on an extra hypothesis concerning the internal times of the atomic system. One would then arrive at formulae different from (7) and (8). (N o such extra assumption has to be made in our work.) Neither Dgllenbach, nor Bacry or Nyborg express the polarization tensor in terms of the proper atomic momentss) pk, qk, vk, etc. (see $2). Kaufman, however, finds in the dipole approximation expressions (49) and(50) correctly. The other papers on the subject consider the Maxwell equations with non-relativistic expressions for the polarization and the magnetization. In these papers averaging procedures are carried out along with a multipole expansion of some kind. Lorentz’ original derivationl) (which was refined by Rosenfeldl) and extended to arbitrary multipole order in Voisin’sll) paper) and Mazur and Nij boer’s treatmentz) were already mentioned in 0 1. Mazur and Nijboer considered the fields as dynamical quantities which depend on the particle phases (positions and velocities), and also explicitly on R and t. As Mazurl2) showed, this requires particular initial conditions to be fulfilled by the fields. Brittinls) and Schraml4) therefore used distribution functions which depend not only on the phases of the particles, but also on those of the field oscillators. DSllenbach7) performed a covariant averaging over small space-time volumes. In the present paper we introduced a covariant averaging over the motion of the particles in a physically small cell. We described this averaging by means of a distribution function which may depend on the atomic positions and multipole moments and on the first and higher time derivatives of these quantities, also taking retardation of the fields into account. The lemma (33), (35), according to which differentiations commute with averaging, was stated already by Rosenfeldl). It was proved in nonrelativistic theory for phase space averages by Irving and Kirkwood6) and, for the same case, derived from conservation of probability alone by Mazur and Nijboerz)*). *) One should note. that these authors write the conservation of probability equation which has the form of a partial differential equation for the probability

as a continuity density in phase

DERIVATION

The treatment

of Mazur

p =
k

M

=

OF MAXWELL’S

and Nijboers)

(pk


-

-

‘Jk’v)

Pk

*

which is indeed the non-relativistic

leads to Maxwell equations with

d(Rk

(pk

265

EQUATIONS

-

-

R>,

qk.V)}

limiting

(54) d(Rk

-

R)>,

(55)

case of (38) with (7) and (8),

as can be seen by neglecting squares of (atomic and intra-atomic) velocities. Results obtained prior to Mazur and Nijboer were not quite so general since they involved only systems at rest or systems moving with uniform velocity, whereas (54) and (55) allow for arbitrary, non-relativistic, motion, just as (38) with (7) and (8) are valid for arbitrary, relativistic, motion.

APPENDIX

Connexion

I

between retarded and ordinary distribution fmctiom

in fluxion

Let us consider a shrinking light wave front in fluxion space arriving in Rk”) = R at the time t, and a volume element dV (around the point Rio’, . . . . Rp’ , t(O) k , ***>lp)) of which two surface elements coincide with the wave front at two different times and the others are perpendicular to the wave front. Now it follows from (25) that the number of atoms, encountered by this wave front in dV is equal to space.

fret(R~“), . . . . RF’,

$“,

. . . . @:“‘jR, t) dV,

(A 1)

This number must be equal to the number of particles present in dV at the time t - IR - Rio’1 / c, when the light wave passes through it:

f(

Rio), . . . . Rp), &O’, . . ., Ep’; t -

IR -

Rio)1 C

>

dV

(A 2)

(where f is the ordinary distribution function defined by (45)), minus the number of particles leaving dV without being struck by the wave. For the latter number we have to consider only the particles escaping through the surface element dS at which the wave front arrives last. (We can disregard the contributions of atoms disappearing through other surface elements, since they are of higher order in the differentials.) The number of atoms disappearing is therefore equal to the number of particles in the volume element (Rp& dt dS, where (Rf’)n is the projection of Ri” in the direction normal to the surface element dS and dt the time which it takes the light to space.

For the proof

conservation

of the lemma,

law, expressing

however,

one could

the fact that, if one follows

alternatively

use a different

form of this

a region of phase space points in its natural

motion, the number of systems with their phases in this region is conserved (cf. eq. (29) in our case). Conversely we could also have used for the proof of our lemma the conservation of particles in the form of a continuity equation. This equation follows for instance from equation (29) and has the form of an integro-differential straightforward.

equations).

The

method

of 5 6 is, however,

somewhat

more

266

S. R. DE GROOT

AND

1. VLIEGER

travel through dV. Since

and cdtdS

= dV,

we find that

so that the number of atoms disappearing

f(

Rp, .

..)

RF), go’, .

is given by

JR ..)

pp;

t

-

Rio’\ c

RLl’.(R c IR -

-

Rio)) dV

(A3)

Rk”‘I

for Rio) # R. For R,(O)= R this number is zero, since the wave front now approaches the volume element in such a way that no particles can escape it. From (A I)-(A 3) we obtain te desired relation (44).

APPENDIX

II

Conservation of charge. From the definitions of the atomic current density (5) and (6), follows the microscopic conservation electric charge dpldt = -Q-i.

chargelaw of (A 4)

With the definition (37) of the macroscopic charge-current density and the fact that differentiation commutes with averaging, we then obtain directly the macroscopic law of conservation of charge +/at = -Q

.I.

(A 5)

The macroscopic charge-current density (Q, Z/c) is a four-vector because its atomic counterpart (5) and (6) is a four-vector. Therefore if Q = 0 in a certain reference frame, the transformed charge density Q’ in a different reference frame will in general not vanish, although the charges ek: are invariant quantities 15). APPENDIX

III

The plasma. In a fully ionized plasma, there are no stable groups of point particles. In the terminology of this paper we have to consider all single electrons and nuclei as sub-units (called “atoms” in $2) numbered by-k. These sub-units have no multipole moments in this theory. Hence the atomic polarization tensor (p, m), given by (7) and (8), vanishes. The atomic field

DERIVATION

OF MAXWELL’S

267

EQUATIONS

equations (3) and (4) become simply V.e=p,

(-4 6)

--doe + V A b = i/c,

(A 7)

with the atomic charge-current density vector (5), (6), where k now numbers all electrons and nuclei. The Maxwell equations (42) and (43) become then V-E =Q,

(A 8)

-&-,E + V A~B;= I/c,

(A 9)

with the macroscopic charge-current vector given by (37). Since P and M vanish, the fields D and H are equal to E and B in this case. Even for plasmas which are not fully ionized, equations (A 8) and (A 9) usually form the starting point. This means that polarizations of the ions are neglected*). APPENDIX

IV

The Lienard-Wiechert retarded Averaged Lihard-Wieckert potentials. potential**) of a set of point particles k has the form

’ = f vk =

2

IR -

Rk I{1 -

&*;.-

&)/Cl

R

- Rk))

(A 10)

for the scalar potential and a similar expression for the vector potential. These are the solutions of (A 6) and (A 7) with (l), (2), (5) and (6). We write the macroscopic potential @(R, t) as the averaged LienardWiechert potential: @(R, t) = ff

q’kfret(& &ciR, t) d& dhk,

(A 11)

where fretis the retarded distribution function in the fluxion space spanned by Rk and tik. We can write (A 11) with (A 10) as

@tR,t, = jj

JR

yRk,f(&,

lilk; t - IR - &l/C) d& diik,

(A 12)

because of the relation (44) between retarded and ordinary distribution functions fret and f in fluxion space. The integration over the velocity gives

@lR,t, =

l’,RTRk,f(Rk; t -

*) We note that in the theory of plasmas, a refractive index, although the polarization **)

Advanced

potentials

could be formally

IR - &l/c) d&,

with (A 8) and (A 9) as Maxwell equations, vanishes. treated

in a completely

similar theory.

(A 13) one derives

268

DERIVATION

which, upon introduction 1

@(I?, t) =

IR - R’j

Now we recognize

OF MAXWELL’S

EQUATIONS

of a delta-function

e&R

can be written as

- R/J f(Rk; t - jR - WI/c) dRk dR’.

here the average charge density _/-Q&R -

Rk) f(&;

t) d&

(A 14)

(37) with (5):

= e(R, t),

(A 15)

so that (A 14) becomes

se(R’,t -

@(R,t) =

IR - R’llc)

dR,

(R - R’1

We have thus derived the expression for the retarded tinuous charge distribution from the Lienard-Wiechert particles. Similarly one finds for the vector potential

A(R, t) =

s

(A 16)



potential of a conpotential of point

l(R’, t - IR - R’llc) dR, IR - R’I ’

(A 17)

where I is the averaged electric current density. The authors are indebted stimulating remarks. Received

to Professor

G. E. Uhlenbeck

for some

9-10-64

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