Abstract
The thermodynamics for Kerr-AdS black hole in four dimensions is revisited using the recently proposed restricted phase space formalism, which includes the central charge C of the dual CFT and the chemical potential mu , but excludes the pressure and the conjugate volume, as thermodynamic variables. The Euler relation holds automatically, and the first order homogeneity of the mass and the zeroth order homogeneity of the intensive variables are made explicit. Thermodynamic processes involving each pair of conjugate variables are studied in some detail, with emphasis on the scaling properties of the equations of states. It turns out that the thermodynamic behavior of the Kerr-AdS black hole is very similar to that of the RN-AdS black hole studied earlier. In particular, it is found that, there is a first order supercritical phase equilibrium in the T-S processes at fixed nonvanishing angular momentum, while at vanishing angular momentum or at fixed angular velocities, there is always a non-equilibrium transition from a small unstable black hole state to a large stable black hole state. Moreover, there is a Hawking–Page phase transition in the mu -C processes. Due to the complicatedness of the Kerr metric, the exact critical point and the Hawking–Page temperature are worked out explicitly only in the slow rotating limit, however the characteristic thermodynamic properties do not rely on the slow rotating approximation.
Highlights
Malisms, i.e. the traditional and the extended phase space (EPS) stages/formalisms
The extended phase space formalism initiated in [8] opened a new era for the thermodynamics of black hole in AdS spacetime by introducing and extra (P, V ) pair of state variables, where P is related to the cosmological constant via P = − /8π G
Please note that the idea of introducing the chemical potential and central charge as new thermodynamic variables has been explored earlier in [20–24], Visser’s work surpasses the previous works in that the (P, V ) variables are changed into (P, V), so that, for charged rotating AdS black holes, the first law takes the form dE = T dS − PdV + ̃ dQ + d J + μdC, which is accompanied with an Euler-like relation
Summary
112 Page 2 of 10 whereand Qare the properly rescaled electric potential and electric charge. [29], the internal energy needs to be a first order homogeneous function in all extensive variables Both the original EPS formalism and Visser’s variant suffer from the “ensemble of theories” issue in the sense that varying cosmological constant (or AdS radius) implies changing the underlying gravity theory. The study of black hole thermodynamics in the RPS formalism may be helpful in further understanding the AdS/CFT correspondence, as will be briefly discussed at the end of this paper. 3, we rewrite the black hole mass as a macro state function in extensive variables and represent the intensive variables in terms of the equations of states In this process, the correct homogeneity behaviors become evident.
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