Holographic RG flows on curved manifolds and quantum phase transitions

Abstract

Holographic RG flows dual to QFTs on maximally symmetric curved manifolds (dSd, AdSd, and Sd) are considered in the framework of Einstein-dilaton gravity in d+1 dimensions. A general dilaton potential is used and the flows are driven by a scalar relevant operator. The general properties of such flows are analyzed and the UV and IR asymptotics computed. New RG flows can appear at finite curvature which do not have a zero curvature counterpart. The so-called 'bouncing flows', where the β-function has a branch cut at which it changes sign, are found to persist at finite curvature. Novel quantum first-order phase transitions are found, triggered by a variation in the d-dimensional curvature in theories allowing multiple ground states.