(P,Q) complex hypercontractivity

Abstract

Let be the standard normal random vector in Rk. Under some mild growth and smoothness assumptions on any increasing P, Q : [0, ∞) [0, ∞) we show (P,Q) complex hypercontractivity Q-1(E Q(|Tzf()|))≤ P-1(EP(|f()|)) holds for all polynomials f:Rk C, where Tz is the hermite semigroup at complex parameter z, |z|≤ 1, if and only if align* |tP''(t)P'(t)-z2tQ''(t)Q'(t)+z2-1|≤ tP''(t)P'(t)-|z|2tQ''(t)Q'(t)+1-|z|2 align* holds for all t>0 provided that F''>0, and F'/F'' is concave, where F = Q P-1. This extends Hariya's result from real to complex parameter z. Several old and new applications are presented for different choices of P and Q. The proof uses heat semigroup arguments, where we find a certain map C(s), which interpolates the inequality at the endpoints. The map C(s) itself is composed of four heat flows running together at different times.

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