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Statistical approach to the geometric structure of thermodynamics

Ryszard MrugałaDepartment of Mathematical Sciences, San Diego State University, San Diego, California 92182James NultonDepartment of Mathematical Sciences, San Diego State University, San Diego, California 92182J. Christian SchönDepartment of Mathematical Sciences, San Diego State University, San Diego, California 92182Peter SalamonDepartment of Mathematical Sciences, San Diego State University, San Diego, California 92182
1990en
ABI

Abstract

We show how both the contact structure and the metric structure of the thermodynamic phase space arise in a natural way from a generalized canonical probability distribution \ensuremath{\rho}. In particular, the metric form and the contact form are found to be derived from the microscopic entropy s=-ln\ensuremath{\rho}. Thus the first law and the second law of thermodynamics can be given the geometric interpretation that a thermodynamic system must possess both a contact and a compatible metric structure. We proceed to construct explicitly a new nondegenerate bilinear form on the thermodynamic phase space, whose restriction to state space yields the Weinhold-Ruppeiner metric, and whose restriction to Gibbs space can serve as an alternative to the metric proposed by Gilmore.

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