Supersymmetric Renyi Entropy and Weyl Anomalies in Six-Dimensional (2,0) Theories

Abstract

We propose a closed formula of the universal part of supersymmetric R\'enyi entropy Sq for (2,0) superconformal theories in six-dimensions. We show that Sq across a spherical entangling surface is a cubic polynomial of γ:=1/q, with all coefficients expressed in terms of the newly discovered Weyl anomalies a and c. This is equivalent to a similar statement of the supersymmetric free energy on conic (or squashed) six-sphere. We first obtain the closed formula by promoting the free tensor multiplet result and then provide an independent derivation by assuming that Sq can be written as a linear combination of 't Hooft anomaly coefficients. We discuss a possible lower bound a c≥ 3 7 implied by our result.