A coarse-grained generalized second law for holographic conformal field theories

Abstract

We consider the universal sector of a d-dimensional large-N strongly-interacting holographic CFT on a black hole spacetime background B. When our CFTd is coupled to dynamical Einstein-Hilbert gravity with Newton constant Gd, the combined system can be shown to satisfy a version of the thermodynamic Generalized Second Law (GSL) at leading order in Gd. The quantity SCFT + A(HB, perturbed)4Gd is non-decreasing, where A(HB, perturbed) is the (time-dependent) area of the new event horizon in the coupled theory. Our SCFT is the notion of (coarse-grained) CFT entropy outside the black hole given by causal holographic information -- a quantity in turn defined in the AdSd+1 dual by the renormalized area Aren(H bulk) of a corresponding bulk causal horizon. A corollary is that the fine-grained GSL must hold for finite processes taken as a whole, though local decreases of the fine-grained generalized entropy are not obviously forbidden. Another corollary, given by setting Gd = 0, states that no finite process taken as a whole can increase the renormalized free energy F = Eout - T SCFT - J - Q, with T, , constants set by HB. This latter corollary constitutes a 2nd law for appropriate non-compact AdS event horizons.