Grand canonical ensemble of a $d$-dimensional Reissner-Nordstr\"om black hole in a cavity

TL;DR

This paper analyzes the thermodynamics of a charged black hole in a cavity within a grand canonical ensemble, revealing stable and unstable solutions, phase behavior, and the influence of dimensionality, especially focusing on five dimensions.

Contribution

It provides a detailed Euclidean path integral analysis of $d$-dimensional Reissner-Nordström black holes in a cavity, identifying stable solutions and thermodynamic properties, with special emphasis on the five-dimensional case.

Findings

Identifies stable and unstable black hole solutions in the grand canonical ensemble.

Derives thermodynamic quantities and phase transition conditions.

Shows that thermodynamic stability relates to heat capacity positivity.

Abstract

The grand canonical ensemble of a $d$-dimensional Reissner-Nordstr\"om black hole space in a cavity is analyzed. The realization of this ensemble is made through the Euclidean path integral approach by giving the Euclidean action for the black hole with the correct topology, and boundary conditions corresponding to a cavity, where the fixed quantities are the temperature and the electric potential. One performs a zero loop approximation to find and analyze the stationary points of the reduced action. This yields two solutions for the electrically charged black hole, $r_{+1}$, which is the smaller and unstable, and $r_{+2}$, which is the larger and stable. One also analyzes the most probable configurations, which are either a stable charged black hole or hot flat space, mimicked by a nongravitating charged shell. Making the correspondence between the action and the grand potential, one can get the black hole thermodynamic quantities, such as the entropy, the mean charge, the mean energy, and the thermodynamic pressure, as well as the Smarr formula, shown to be valid only for the unstable black hole. We find that thermodynamic stability is related to the positivity of the heat capacity at constant electric potential and area of the cavity. We also comment on the most favorable thermodynamic phases and phase transitions. We then choose $d = 5$, which is singled out naturally from the other higher dimensions as it provides an exact solution for the problem, and apply all the results previously found. The case $d = 4$ is mentioned. We compare thermodynamic radii with the photonic orbit radius and the Buchdahl-Andr\'easson-Wright bound radius in $d$-dimensional Reissner-Nordstr\"om spacetimes and find they are unconnected, showing that the connections displayed in the Schwarzschild case are not generic, rather they are very restricted holding only in the pure gravitational situation.