The Role of the Volume in Black Hole Thermodynamics

Abstract

Gibbons et al. [arXiv:hep-th/0408217] found the energy E of Kerr--anti-de Sitter black holes by integrating the first law of black hole thermodynamics. They found that E corresponds to the Ashtekar--Magnon--Das (AMD) energy associated with an asymptotically nonrotating frame, whereas the AMD ``energy'' which I will call F associated with an asymptotically rotating frame does not satisfy the first law. In Cvetič et al. [arXiv:1012.2888], the first law was extended by interpreting E as an enthalpy and Λ as being proportional to a pressure. The term conjugate to the pressure was then interpreted as the ``thermodynamic volume'' Vth. Associated with the first law (with varying pressure) is a Smarr relation for E. The Smarr relation for F also exists, and the term conjugate to the pressure in that Smarr relation is the ``geometric volume'' Vgeo, shown in [arXiv:1310.1935] to be equal to the vector volume VC of the black hole. To address why it is necessary to use E rather than F to have a viable first law but VC appears naturally in the Smarr relation associated with F rather than E, I adapt Barnich and Compère [arXiv:gr-qc/0412029], by defining a conserved quantity HIχ associated with Killing vector χ. E and F are given by HIξ and HIβ respectively where ξ is asymptotically hypersurface-orthogonal and β is proportional to the divergence of the Principal Conformal Killing--Yano tensor h. I show that the first law will be satisfied by HIχ if both χa and the background anti-de Sitter metric have unvarying components, which holds for ξa but not βa, explaining why the first law works for E but not F. I show that VC appears in the β-associated Smarr relation due to simplifications related to h.