SciPost Submission Page

Virtual work, thermodynamic structure of the spacetime, and black hole criticality

by Dumitru Astefanesei, Gonzalo Casanova, Raul Rojas

Submission summary

Authors (as registered SciPost users):

Raúl Rojas

Abstract

We propose a new way to relate the black hole thermodynamics and geometry by generalizing the Euclidean formalism to include 'virtual geometries', which do not necessarily satisfy Einstein equations. This provides a physically well motivated route to study black hole criticality and obtain the Landau–Ginzburg potential. We compute the `virtual thermodynamic potential' and show that it satisfies a modified quantum statistical relation that is compatible with the first law of black hole thermodynamics supplemented with an extra term, interpreted as virtual work in previous literature. The novelty is that, within our formalism, we can explicitly compute this term as the first derivative of the virtual thermodynamic potential with respect to the horizon radius that is considered as the order parameter. Imposing the physical condition that the first derivative vanishes is at the basis of the matching between the first law of black hole thermodynamics and (one of the) Einstein equations evaluated at the horizon. Interestingly, imposing the physical conditions that the second and third derivatives vanish, we can concretely study the criticality and existence of swallow tails. As a specific example, we apply this formalism to an exact $4-$dimensional asymptotically flat hairy black hole, namely the generalized Kaluza-Klein (KK) black hole when the dilaton potential is included, and show that it is thermodynamically stable and has a non-trivial critical behaviour corresponding to an inverted swallowtail.