Riemannian thermo-statistics geometry

Abstract

It is developed a Riemannian reformulation of classical statistical mechanics for systems in thermodynamic equilibrium, which arises as a natural extension of Ruppeiner geometry of thermodynamics. The present proposal leads to interpret entropy Sg(I|θ) and all its associated thermo-statistical quantities as purely geometric notions derived from the Riemannian structure on the manifold of macroscopic observables Mθ (existence of a distance ds2=gij(I|θ)dIidIj between macroscopic configurations I and I+dI). Moreover, the concept of statistical curvature scalar R(I|θ) arises as an invariant measure to characterize the existence of an irreducible statistical dependence among the macroscopic observables I for a given value of control parameters θ. This feature evidences a certain analogy with Einstein General Relativity, where the spacetime curvature R(r,t) distinguishes the geometric nature of gravitation and the reducible character inertial forces with an appropriate selection of the reference frame.