Strong Haagerup inequality with operator coefficients

Abstract

We prove a Strong Haagerup inequality with operator coefficients. If for an integer d, Hd denotes the subspace of the von Neumann algebra of a free group FI spanned by the words of length d in the generators (but not their inverses), then we provide in this paper an explicit upper bound on the norm on Mn(Hd), which improves and generalizes previous results by Kemp-Speicher (in the scalar case) and Buchholz and Parcet-Pisier (in the non-holomorphic setting). Namely the norm of an element of the form Σi=(i1,..., id) ai λ(gi1 ... gid) is less than 45 e (\|M0\|2+...+\|Md\|2)1/2, where M0,...,Md are d+1 different block-matrices naturally constructed from the family (ai)i ∈ Id for each decomposition of Id = Il × Id-l with l=0,...,d. It is also proved that the same inequality holds for the norms in the associated non-commutative Lp spaces when p is an even integer, p>d and when the generators of the free group are more generally replaced by *-free R-diagonal operators. In particular it applies to the case of free circular operators. We also get inequalities for the non-holomorphic case, with a rate of growth of order d+1 as for the classical Haagerup inequality. The proof is of combinatorial nature and is based on the definition and study of a symmetrization process for partitions.