Hyper-contractivity and entropy decay in discrete time

Abstract

Consider a measure-preserving transition kernel T on an arbitrary probability space ( X, cA,π). In this level of generality, we prove that a one-step hyper-contractivity estimate of the form \|T\|p q 1 with p< q implies a one-step entropy contraction estimate of the form H(μ T\,|\,π) θ\, H(μ\,|\,π), with θ=p/q. Neither reversibility, nor any sort of regularity is required. This static implication is simultaneously simpler and stronger than the celebrated dynamic relation between exponential hyper-contractivity and exponential entropy decay along continuous-time Markov semi-groups.