Holographic Interpolation between $a$ and $F$

TL;DR

This paper demonstrates that the holographic interpolating function $ ilde F$, connecting the $a$-anomaly coefficient and sphere free energy, smoothly varies with dimension and monotonically decreases along RG flows, confirming a conjecture in continuous dimensions.

Contribution

It proves the monotonicity of the holographic interpolating function $ ilde F$ in continuous dimensions, extending the holographic $c$-theorem to arbitrary $d$ and confirming the conjecture.

Findings

$ ilde F$ is a smooth function of $d$

$ ilde F$ correctly interpolates $a$ coefficients and free energies

Monotonicity of $ ilde F$ along RG flows is established

Abstract

An interpolating function $\tilde F$ between the $a$-anomaly coefficient in even dimensions and the free energy on an odd-dimensional sphere has been proposed recently and is conjectured to monotonically decrease along any renormalization group flow in continuous dimension $d$. We examine $\tilde F$ in the large-$N$ CFT's in $d$ dimensions holographically described by the Einstein-Hilbert gravity in the AdS$_{d+1}$ space. We show that $\tilde F$ is a smooth function of $d$ and correctly interpolates the $a$ coefficients and the free energies. The monotonicity of $\tilde F$ along an RG flow follows from the analytic continuation of the holographic $c$-theorem to continuous $d$, which completes the proof of the conjecture.