Characteristic state function

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

${\displaystyle P=\exp(-\beta Q)\Leftrightarrow Q=-{\frac {1}{\beta }}\ln(P)}$ or ${\displaystyle P=\exp(+\beta Q)\Leftrightarrow Q={\frac {1}{\beta }}\ln(P)}$

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.

Examples

• The microcanonical ensemble satisfies ${\displaystyle \Omega (U,V,N)=e^{\beta TS}\;\,}$  hence, its characteristic state function is ${\displaystyle TS}$ .
• The canonical ensemble satisfies ${\displaystyle Z(T,V,N)=e^{-\beta A}\,\;}$  hence, its characteristic state function is the Helmholtz free energy ${\displaystyle A}$ .
• The grand canonical ensemble satisfies ${\displaystyle {\mathcal {Z}}(T,V,\mu )=e^{-\beta \Phi }\,\;}$ , so its characteristic state function is the Grand potential ${\displaystyle \Phi }$ .
• The isothermal-isobaric ensemble satisfies ${\displaystyle \Delta (N,T,P)=e^{-\beta G}\;\,}$  so its characteristic function is the Gibbs free energy ${\displaystyle G}$ .

State functions are those which tell about the equilibrium state of a system

References

1. Balian, Roger (2017-11-01). "François Massieu and the thermodynamic potentials". Comptes Rendus Physique. 18 (9–10): 526–530. Bibcode:2017CRPhy..18..526B. doi:10.1016/j.crhy.2017.09.011. ISSN 1631-0705. "Massieu's potentials [...] are directly recovered as logarithms of partition functions."