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Thermodynamic systems as extremal hypersurfaces

Mathematical Physics 2011-04-07 v1 math.MP

Abstract

We apply variational principles in the context of geometrothermodynamics. The thermodynamic phase space T{\cal T} and the space of equilibrium states E{\cal E} turn out to be described by Riemannian metrics which are invariant with respect to Legendre transformations and satisfy the differential equations following from the variation of a Nambu-Goto-like action. This implies that the volume element of E{\cal E} is an extremal and that E{\cal E} and T{\cal T} are related by an embedding harmonic map. We explore the physical meaning of geodesic curves in E{\cal E} as describing quasi-static processes that connect different equilibrium states. We present a Legendre invariant metric which is flat (curved) in the case of an ideal (van der Waals) gas and satisfies Nambu-Goto equations. The method is used to derive some new solutions which could represent particular thermodynamic systems.

Keywords

Cite

@article{arxiv.1101.3359,
  title  = {Thermodynamic systems as extremal hypersurfaces},
  author = {Alejandro Vazquez and Hernando Quevedo and Alberto Sanchez},
  journal= {arXiv preprint arXiv:1101.3359},
  year   = {2011}
}
R2 v1 2026-06-21T17:13:22.119Z