An a-theorem for Horndeski Gravity at the Critical Point

Abstract

We study holographic conformal anomalies and the corresponding a-theorem for Einstein gravity extended with Horndeski terms that involve up to and including linear curvature tensors. We focus on our discussion in D=5 bulk dimensions. For the generic Horndeski coupling, the a-charge is the same as that in Einstein gravity, but the inclusion of the Horndeski term violates the a-theorem. However, there exists a critical point of the Horndeski coupling, for which the theory admits nearly AdS spacetimes with non-vanishing Horndeski scalar. The full AdS isometry is broken down by the logarithmic scalar hair to the Poincar\'e group plus the scale invariance. We find that in this case the a-charge depends on the AdS radius and the integration constant s of the Horndeski scalar. In addition, we find that two new central charges emerge, that are absent in gravities with minimally-coupled matter. We call them b-charges. These b-charges also depend on and s. We construct an a-function for fixed but with the running Horndeski scalar replacing the constant s, and establish the holographic a-theorem using the null energy condition in the bulk. Furthermore, we find that there exist analogous monotonous b-functions as well. We also obtain the a-charge and the a-theorem in general odd bulk dimensions.