Saved in:
Bibliographic Details
Main Authors: Barzi, F., Moumni, H. El, Masmar, K.
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2408.05870
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866909379279716352
author Barzi, F.
Moumni, H. El
Masmar, K.
author_facet Barzi, F.
Moumni, H. El
Masmar, K.
contents It's widely recognized that the free energy landscape captures the essentials of thermodynamic phase transitions. In this work, we extend the findings of [1] by incorporating the nonextensive nature of black hole entropy. Specifically, the connection between black hole phase transitions and the winding number of Riemann surfaces derived through complex analysis is extended to the Rényi entropy framework. This new geometrical and non-extensive formalism is employed to predict the phase portraits of charged-flat black holes within both the canonical and grand canonical ensembles. Furthermore, we elucidate novel relations between the number of sheets comprising the Riemann surface of the Hawking-Page and Van der Waals transitions and the dimensionality of black hole spacetimes. Notably, these new numbers are consistent with those found for charged-AdS black holes in Gibbs-Boltzmann statistics, providing another significant example of the potential connection between the cosmological constant and the nonextensive Rényi parameter.
format Preprint
id arxiv_https___arxiv_org_abs_2408_05870
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Riemann Surfaces and Winding Numbers of Rényi Phase Structure of Charged-Flat Black Holes
Barzi, F.
Moumni, H. El
Masmar, K.
High Energy Physics - Theory
It's widely recognized that the free energy landscape captures the essentials of thermodynamic phase transitions. In this work, we extend the findings of [1] by incorporating the nonextensive nature of black hole entropy. Specifically, the connection between black hole phase transitions and the winding number of Riemann surfaces derived through complex analysis is extended to the Rényi entropy framework. This new geometrical and non-extensive formalism is employed to predict the phase portraits of charged-flat black holes within both the canonical and grand canonical ensembles. Furthermore, we elucidate novel relations between the number of sheets comprising the Riemann surface of the Hawking-Page and Van der Waals transitions and the dimensionality of black hole spacetimes. Notably, these new numbers are consistent with those found for charged-AdS black holes in Gibbs-Boltzmann statistics, providing another significant example of the potential connection between the cosmological constant and the nonextensive Rényi parameter.
title Riemann Surfaces and Winding Numbers of Rényi Phase Structure of Charged-Flat Black Holes
topic High Energy Physics - Theory
url https://arxiv.org/abs/2408.05870