Black hole thermodynamic free energy as A-discriminants

Abstract

We show that the free energy F and temperature T of black holes, considered as a thermodynamic system, can be viewed as an A-discriminant of an appropriately-defined polynomial. As such, mathematical results about A-discriminants may lead to implications about black hole thermodynamics. In particular, for static spacetimes with spherical, planar, or hyperbolic symmetry, the number of distinct thermodynamic phases depend on the number of distinct terms in the metric component gtt. We prove that if gtt consists of Nf distinct terms, then the F-T curve consists of Nf-2 cusps, which in turn leads to Nf-1 distinct thermodynamic phases. This result is applied to explicit examples of the Schwarzschild-AdS, Reissner--Nordstr\"om, power-law Maxwell, and Euler--Heisenberg black holes.

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