Problems 493∗12.6. Consider two distinguishable particles in one dimension with respective coor-
dinatesxandyand conjugate momentapxandpywith a HamiltonianHˆ= pˆ2
x
2 m+
pˆ^2 y
2 M+U(ˆx) +1
2
Mω^2 yˆ^2 −λˆxy.ˆa. Show that the density matrixρ(x,y,x′,y′;β) can be written in the formρ(x,y,x′,y′;β)=
∫x(β ̄h)=x′x(0)=xDx(τ) exp[
−
1
̄h∫β ̄h0dτ(
1
2
mx ̇^2 (τ) +U(x(τ)))]
T[x;y,y′],whereT[x;y,y′] is known as theinfluence functional. What is the func-
tional integral expression forT[x;y,y′], and of what function isT[x;y,y′]
a functional?b. Using the method of expansion about the classical path, derive aclosed
form expression forT(x(τ),y,y′) by evaluating the functional integral.12.7. A fourth-order Trotter formula valid for traces (Takahashi and Imada, 1984)
is
Tr[
e−λ(Aˆ+Bˆ)]
≈Tr{[
e−λ
A/Pˆ
e−λC/Pˆ ]P
}
+O
(
λ^5 P−^4)
,
when [A,ˆBˆ] 6 = 0.Cˆ=Bˆ+^1
24(
λ
P) (^2) [
B,ˆ
[
A,ˆBˆ
]]
.
Derive the discrete path integral expression for the canonical partition func-
tionQ(N,V,T) forNBoltzmann particles in three dimensions that results
from applying this approximation. In particlar, show that theN-particle po-
tentialU(r 1 ,...,rN) is replaced by a new effective potentialU ̃(r 1 ,...,rN) and
derive the expression for this new potential.12.8. Consider a system of two distinguishable degrees of freedom with position
operators ˆxandXˆand corresponding momenta ˆpandPˆ, respectively, with
Hamiltonian
Hˆ= pˆ2
2 m+
Pˆ^2
2 M
+U(ˆx,Xˆ).Assume that the massesMandmare such thatM≫m, meaning that the
two degrees of freedom are adiabatically decoupled.
a. Show that the partition function of the system can be approximated asQ(β) =∑
n∮
DX(τ) exp{
−
1
̄h∫β ̄h0dτ[
1
2
MX ̇^2 (τ) +εn(X(τ))