Scrambling in Hyperbolic Black Holes: shock waves and pole-skipping

Abstract

We study the scrambling properties of (d+1)-dimensional hyperbolic black holes. Using the eikonal approximation, we calculate out-of-time-order correlators (OTOCs) for a Rindler-AdS geometry with AdS radius , which is dual to a d-dimensional conformal field theory (CFT) in hyperbolic space with temperature T = 1/(2 π ). We find agreement between our results for OTOCs and previously reported CFT calculations. For more generic hyperbolic black holes, we compute the butterfly velocity in two different ways, namely: from shock waves and from a pole-skipping analysis, finding perfect agreement between the two methods. The butterfly velocity vB(T) nicely interpolates between the Rindler-AdS result vB(T=12π )=1d-1 and the planar result vB(T 1)=d2(d-1).