Black Hole Enthalpy and an Entropy Inequality for the Thermodynamic Volume

Abstract

In a theory where the cosmological constant or the gauge coupling constant g arises as the vacuum expectation value, its variation should be included in the first law of thermodynamics for black holes. This becomes dE= TdS + i dJi + α d Qα + d , where E is now the enthalpy of the spacetime, and , the thermodynamic conjugate of , is proportional to an effective volume V = -16 π D-2 "inside the event horizon." Here we calculate and V for a wide variety of D-dimensional charged rotating asymptotically AdS black hole spacetimes, using the first law or the Smarr relation. We compare our expressions with those obtained by implementing a suggestion of Kastor, Ray and Traschen, involving Komar integrals and Killing potentials, which we construct from conformal Killing-Yano tensors. We conjecture that the volume V and the horizon area A satisfy the inequality R ((D-1)V/ AD-2)1/(D-1)\, ( AD-2/A)1/(D-2)1, where AD-2 is the volume of the unit (D-2)-sphere, and we show that this is obeyed for a wide variety of black holes, and saturated for Schwarzschild-AdS. Intriguingly, this inequality is the "inverse" of the isoperimetric inequality for a volume V in Euclidean (D-1) space bounded by a surface of area A, for which R 1. Our conjectured Reverse Isoperimetric Inequality can be interpreted as the statement that the entropy inside a horizon of a given "volume" V is maximised for Schwarzschild-AdS. The thermodynamic definition of V requires a cosmological constant (or gauge coupling constant). However, except in 7 dimensions, a smooth limit exists where or g goes to zero, providing a definition of V even for asymptotically-flat black holes.