ar X iv : c on d - m at / 9 80 13 22 v 2 2 0 M ar 1 99 8 Two - Dimensional Coulomb Systems on a Surface of Constant Negative Curvature

Abstract

We study the equilibrium statistical mechanics of classical two-dimensional Coulomb systems living on a pseudosphere (an infinite surface of constant negative curvature). The Coulomb potential created by one point charge exists and goes to zero at infinity. The pressure can be expanded as a series in integer powers of the density (the virial expansion). The… (More)

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@inproceedings{Tllez1998arXI, title={ar X iv : c on d - m at / 9 80 13 22 v 2 2 0 M ar 1 99 8 Two - Dimensional Coulomb Systems on a Surface of Constant Negative Curvature}, author={Gabriel T{\'e}llez}, year={1998} }