The characteristic state function or Massieu's potential[1] in statistical mechanics refers to a particular relationship between the partition function of an ensemble.
In particular, if the partition function P satisfies
P=\exp(-\betaQ)\LeftrightarrowQ=-
| 1 | |
| \beta |
ln(P)
P=\exp(+\betaQ)\LeftrightarrowQ=
| 1 | |
| \beta |
ln(P)
in which Q is a thermodynamic quantity, then Q is known as the "characteristic state function" of the ensemble corresponding to "P". Beta refers to the thermodynamic beta.
\Omega(U,V,N)=e
TS
Z(T,V,N)=e-
A
lZ(T,V,\mu)=e-\beta
\Phi
\Delta(N,T,P)=e-\beta
G
State functions are those which tell about the equilibrium state of a system