The Smarr formula within the Geroch-Held-Penrose formalism

TL;DR

This paper develops a geometric thermodynamic formulation of black hole field equations using the Geroch-Held-Penrose formalism, revealing new insights into the Smarr relation and horizon thermodynamics.

Contribution

It introduces a novel geometric approach to derive the Smarr formula within the GHP formalism, connecting horizon geometry with thermodynamic variables in various gravity theories.

Findings

Derived the Smarr formula for Reissner-Nordström-AdS black holes.

Established a link between Penrose and Rindler K-curvature and black hole thermodynamics.

Proposed a revised definition of black hole internal energy based on geometric quantities.

Abstract

The connection between classical thermodynamics and black hole horizons is a fundamental topic in gravitational physics, offering a potential pathway to understanding quantum aspects of gravity. However, while black hole mechanics exhibits well-known thermodynamic parallels, a rigorous geometric interpretation of thermodynamic variables directly from the field equations warrants further research. In this manuscript, we present a thermodynamic formulation of the field equations through the decomposition of the Riemann tensor, employing the Geroch-Held-Penrose (GHP) formalism, to clarify a strong correspondence between black hole thermodynamic variables and geometrical quantities derived from horizon geometry. Our analysis reveals an intrinsic connection between the Penrose and Rindler $K$-curvature and the Smarr relation, motivating a revised definition of both trapping gravity and black hole internal energy. Additionally, we derive through this GHP formalism the Smarr formula for the Reissner-N\"ordstrom black hole cointained in an AdS spacetime and we explore the implications of this relationship for black holes with exotic topologies and in the context of extended theories, exemplified by $f(R)$ gravity. These findings suggest a deeper geometrical basis for black hole thermodynamics, potentially advancing our understanding of gravitational energy, horizon entropy, and their significance within quantum gravity frameworks.