On the Chaos Bound in Rotating Black Holes

Abstract

We study out-of-time-order correlators (OTOCs) of rotating BTZ black holes using two different approaches: the elastic eikonal gravity approximation, and the Chern-Simons formulations of 3-dimensional gravity. Within both methods the OTOC is given as a sum of two contributions, corresponding to left and right moving modes. The contributions have different Lyapunov exponents, λL=2πβ11 , where is the angular velocity and is the AdS radius. Since λL- ≤ 2πβ ≤ λL+, there is an apparent contradiction with the chaos bound. We discuss how the result can be made consistent with the chaos bound if one views β=β(1 ) as the effective inverse temperatures of the left and right moving modes.