Two aspects of black hole entropy in Lanczos-Lovelock models of gravity

Sanved Kolekar, Dawood Kothawala, and T. Padmanabhan
Phys. Rev. D 85, 064031 – Published 21 March 2012

Abstract

We consider two specific approaches to evaluate the black hole entropy which are known to produce correct results in the case of Einstein’s theory and generalize them to Lanczos-Lovelock models. In the first approach (which could be called extrinsic), we use a procedure motivated by earlier work by Pretorius, Vollick, and Israel, and by Oppenheim, and evaluate the entropy of a configuration of densely packed gravitating shells on the verge of forming a black hole in Lanczos-Lovelock theories of gravity. We find that this matter entropy is not equal to (it is less than) Wald entropy, except in the case of Einstein theory, where they are equal. The matter entropy is proportional to the Wald entropy if we consider a specific mth-order Lanczos-Lovelock model, with the proportionality constant depending on the spacetime dimensions D and the order m of the Lanczos-Lovelock theory as (D2m)/(D2). Since the proportionality constant depends on m, the proportionality between matter entropy and Wald entropy breaks down when we consider a sum of Lanczos-Lovelock actions involving different m. In the second approach (which could be called intrinsic), we generalize a procedure, previously introduced by Padmanabhan in the context of general relativity, to study off-shell entropy of a class of metrics with horizon using a path integral method. We consider the Euclidean action of Lanczos-Lovelock models for a class of metrics off shell and interpret it as a partition function. We show that in the case of spherically symmetric metrics, one can interpret the Euclidean action as the free energy and read off both the entropy and energy of a black hole spacetime. Surprisingly enough, this leads to exactly the Wald entropy and the energy of the spacetime in Lanczos-Lovelock models obtained by other methods. We comment on possible implications of the result.

  • Received 21 November 2011

DOI:https://doi.org/10.1103/PhysRevD.85.064031

© 2012 American Physical Society

Authors & Affiliations

Sanved Kolekar1,*, Dawood Kothawala2,†, and T. Padmanabhan1,‡

  • 1IUCAA, Pune University Campus, Ganeshkhind, Pune 411007, India
  • 2Department of Mathematics Statistics, University of New Brunswick, Fredericton, New Brunswick, Canada E3B 5A3

  • *sanved@iucaa.ernet.in
  • dawood.ak@gmail.com
  • paddy@iucaa.ernet.in

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Issue

Vol. 85, Iss. 6 — 15 March 2012

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