13.3 Diffusive Metals
In diffusive metals, there is one component which is out of phase and one component which is in phase
(eqn. 229):
m
−edv(t)
︸ ︷︷dt︸−
v(t)
︸︷︷μ︸= E(t) (229)The first term is the initial term(out of phase), the second term is the scattering term(in phase).
Again, the solution of a harmonic oscillator is assumed (E(ω)e−iωt;v(ω)e−iωt):
(
iωm
e−
1
μ
)v(ω) = E(ω) (230)As before we calculate the conductivity:
σ(ω) =j(ω)
E(ω)=
−nev(ω)
E(ω)
=ne(−iωm
e+
1
μ)−^1
=⇒
σ(ω) = ne(eμ
e−iμωm
) = neμ(1
1 −iωτ
) = neμ(1 +iωτ
1 +ω^2 τ^2) (231)
For low frequencies(the probability for the electrons to get scattered is high) it is possible to neglect
iωτ
ω^2 τ^2 and as a result the conductivity is:
σ(lowω) = neμ
The solution for high frequenciesis thesameas for collisionless metals:
σ(highω) =ine^2
ωmwith
μ =
eτ
mWithσit’s possible to calculate the susceptibility:
χ(ω) =
P(ω)
0 E(ω)=
nex(ω)
0 E(ω)=
nev(ω)
iω 0 E(ω)=
σ(ω)
iω 0=
neμ
iω 0(
1 +iωτ
1 +ω^2 τ^2) (232)
And again the dielectric constant:
(ω) = 1 +χ = 1−
neμ
ω 0(
ωτ−i
1 +ω^2 τ^2) (233)
=⇒
(ω) = 1−ω^2 p(
ωτ^2 −iτ
ω+ω^3 τ^2