Phase space and partition function 271f 1 (x 1 ,N 1 ) =(
e−βH^1 (x^1 ,N^1 )
Q(N,V,T)N 1 !h^3 N^1)
1
(N−N 1 )!h3(N−N^1 )∫
dx 2 e−βH^2 (x^2 ,N−N^1 )=
Q 2 (N−N 1 ,V−V 1 ,T)
Q(N,V,T)
1
N 1 !h^3 N^1e−βH^1 (x^1 ,N^1 ), (6.4.10)satisfies the normalization condition
∑NN 1 =0∫
dx 1 f(x 1 ,N 1 ) = 1. (6.4.11)Since the total partition function is canonical,Q(N,V,T) = exp[−βA(N,V,T)] where
A(N,V,T) is the Helmholtz free energy, and it follows that
Q 2 (N−N 1 ,V−V 1 ,T)
Q(N,V,T)= e−β[A(N−N^1 ,V−V^1 ,T)−A(N,V,T)], (6.4.12)where we have assumed that system 1 and system 2 are described by the same set of
physical interactions, so that the functional form of the free energy is the same for
both systems and for the total system. SinceN≫N 1 andV≫V 1 , we may expand
A(N−N 1 ,V−V 1 ,T) aboutN 1 = 0 andV 1 = 0. To first order, the expansion yields
A(N−N 1 ,V−V 1 ,T)≈A(N,V,T)−
∂A
∂N
N 1 −
∂A
∂V
V 1
=A(N,V,T)−μN 1 +PV 1. (6.4.13)Thus, the phase space distribution of system 1 becomes
f(x 1 ,N 1 ) =1
N 1 !h^3 N^1eβμN^1 e−βPV^1 e−βH^1 (x^1 ,N^1 )=
1
N 1 !h^3 N^1eβμN^11
eβPV^1e−βH^1 (x^1 ,N^1 ). (6.4.14)Since system 2 quantities no longer appear in eqn. (6.4.14), we may drop the “1”
subscript and write the phase space distribution for the grand canonical ensemble as
f(x,N) =1
N!h^3 NeβμN1
eβPVe−βH(x,N). (6.4.15)Moreover, taking the thermodynamic limit, the summation overNis now unrestricted
(N∈[0,∞)), so the normalization condition becomes
∑∞N=0∫
dxf(x,N) = 1, (6.4.16)which implies that