Using the fact that creation operators always anti-commutewith one another, it is straightforward
to show that
b†σ 1 (~k 1 )···b†σi(~ki)···b†σj(~kj)···b†σn(~kn)|∅〉 (19.76)
=−b†σ 1 (~k 1 )···b†σj(~kj)···b†σi(~ki)···b†σn(~kn)|∅〉 (19.77)so that the state obeys Fermi-Dirac statistics.
19.8 The photon spin and helicity
Just as we constructed the electro-magnetic momentum in terms of the Poynting vectors, so we
may also construct its total angular momentum,
J=∫
d^3 x(
x×(E×B))
(19.78)Total angular momentum actually receives contributions from an orbital partLas well as from an
intrinsic photon spin partS, with the usual addition relation,J=L+S. We are concerned with
the spin part, and seek to separate it fromL. This separation cannot in fact be achieved in a gauge
invariant way. Thehelicity of the photon, i.e. the projection of spin onto the photon momentum
is the only part of the spin which can be isolated in a gauge invariant way.
We begin by producing a gauge dependent construction ofLandS, and we shall then extract
from these the gauge invariant helicity. UsingB=∇×Aand the double cross product formula,
we have
E×B =∑i(
Ei(∇Ai)−(∇iA)Ei)=
∑i(
Ei(∇Ai)−∇i(AEi))
(19.79)where we have used∇·E= 0 in going from the first to the second line. Next, we evaluate
x×(
E×B)
=∑i(
Ei(x×∇)Ai−∇i(x×AEi) +E×A)
(19.80)The second term is clearly a surface term, and does not contribute to the integral when evaluating
J. The first term involves the orbital angular momentum operatorx×∇, and naturally is associated
with orbital angular momentum, though it is not gauge invariant. Thus, we define,
L =∫
d^3 x∑iEi(
x×∇)
AiS =
∫
d^3 xE×A (19.81)In transverse gauge,∇·A= 0, the orbital part is automatically transverse to momentum, so we
shall use this gauge to evaluate spin. ExpressingSin terms ofC(t,k),
S=∫
d^3 k
(2π)^3
C(t,k)×∂tC(t,k) (19.82)