The strong Haagerup inequality for q-circular systems

Abstract

Together with Speicher, in 2007 the first author proved the strong Haagerup inequality for operator norms of homogeneous holomorphic polynomials in freely independent R-diagonal elements (including in particular circular random variables); the inequality improved the bound from the original Haagerup inequality to grow with n, rather than linearly in n, on homogeneous polynomials of degree n. In this paper, we prove a similar inequality for q-circular systems for |q|<1, generalizing the free case when q=0. In particular, we prove the strong Haagerup inequality for systems exhibiting neither free independence nor R-diagonality. As an application, we prove a strong ultracontractivity theorem for the q-Ornstein--Uhlenbeck semigroup, and prove sharp rates for the Haagerup and ultracontractive inequalities.