R\'enyi mutual information inequalities from Rindler positivity

Abstract

Rindler positivity is a property that holds in any relativistic Quantum Field Theory and implies an infinite set of inequalities involving the exponential of the R\'enyi mutual information In(Ai,Aj) between Ai and Aj, where Ai is a spacelike region in the right Rindler wedge and Aj is the wedge reflection of Aj. We explore these inequalities in order to get local inequalities for In(A,A) as a function of the distance between A and its mirror region A. We show that the assumption, based on the cluster property of the vacuum, that In goes to zero when the distance goes to infinity, implies the more stringent and simple condition that Fne(n-1)In should be a completely monotonic function of the distance, meaning that all the even (odd) derivatives are non-negative (non-positive). In the case of a CFT in 1+1 dimensions, we show that conformal invariance implies stronger conditions, including a sort of monotonicity of the R\'enyi mutual information for pairs of intervals. An application of these inequalities to obtain constraints for the OPE coefficients of the 4-point function of certain twist operators is also discussed.