Holographic phase space: $c$-functions and black holes as renormalization group flows

TL;DR

This paper introduces a holographic $ u$-function in Lovelock gravity that tracks the flow of degrees of freedom from UV to IR, relates it to entropy and phase space, and connects it to entropic gravity concepts.

Contribution

It constructs a $ u$-function for Lovelock theories, linking holographic $c$-functions, black hole entropy, and phase space, extending the concept to black hole geometries and connecting to entropic gravity.

Findings

$ u$-function decreases from UV to IR in domain-wall backgrounds.

At black hole horizons, $ u$ is proportional to entropy.

The $ u$-function relates to Verlinde's entropic gravity and effective field theory cut-offs.

Abstract

We construct a $\mathcal N$-function for Lovelock theories of gravity, which yields a holographic $c$-function in domain-wall backgrounds, and seemingly generalizes the concept for black hole geometries. A flow equation equates the monotonicity properties of $\mathcal N$ with the gravitational field, which has opposite signs in the domain-wall and black hole backgrounds, due to the presence of negative/positive energy in the former/latter, and accordingly $\mathcal N$ monotonically decreases/increases from the UV to the IR. On $AdS$ spaces the $\mathcal N$-function is related to the Euler anomaly, and at a black hole horizon it is generically proportional to the entropy. For planar black holes, $\mathcal N$ diverges at the horizon, which we interpret as an order $N^2$ increase in the number of effective degrees of freedom. We show how $\mathcal N$ can be written as the ratio of the Wald entropy to an effective phase space volume, and using the flow equation relate this to Verlinde's notion of gravity as an entropic force. From the effective phase space we can obtain an expression for the dual field theory momentum cut-off, matching a previous proposal in the literature by Polchinski and Heemskerk. Finally, we propose that the area in Planck units counts states, not degrees of freedom, and identify it also as a phase space volume. Written in terms of the proper radial distance $\beta$, it takes the suggestive form of a canonical partition function at inverse temperature $\beta$, leading to a "mean energy" which is simply the extrinsic curvature of the surface. Using this we relate this definition of holographic phase space with the effective phase space appearing in the $\mathcal N$-function.