Quantum Symmetries and Strong Haagerup Inequalities

Abstract

In this paper, we consider families of operators \xr\r ∈ in a tracial C-probability space ( A, φ), whose joint -distribution is invariant under free complexification and the action of the hyperoctahedral quantum groups \Hn+\n ∈ . We prove a strong form of Haagerup's inequality for the non-self-adjoint operator algebra B generated by \xr\r ∈ , which generalizes the strong Haagerup inequalities for -free R-diagonal families obtained by Kemp-Speicher KeSp. As an application of our result, we show that B always has the metric approximation property (MAP). We also apply our techniques to study the reduced C-algebra of the free unitary quantum group Un+. We show that the non-self-adjoint subalgebra Bn generated by the matrix elements of the fundamental corepresentation of Un+ has the MAP. Additionally, we prove a strong Haagerup inequality for Bn, which improves on the estimates given by Vergnioux's property RD Ve.