A unification of the hypercontractivity and its exponential variant of the Ornstein-Uhlenbeck semigroup

Abstract

Let γd be the d-dimensional standard Gaussian measure and \Qt\t 0 the Ornstein-Uhlenbeck semigroup acting on L1(γd). We show that the hypercontractivity of \Qt\t 0 is equivalent to the property that align* \ ∫Rd (e2tQtf) dγd \ 1/e2t ∫Rdef\,dγd, align* which holds for any f∈ L1(γd) with ef∈ L1(γd) and for any t 0. We then derive a family of inequalities that unifies this exponential variant and the original hypercontractivity, a generalization of the Gaussian logarithmic Sobolev inequality is obtained as a corollary. A unification of the reverse hypercontractivity and the exponential variant is also provided.