Free Hilbert Transforms

Abstract

We study analogues of classical Hilbert transforms as fourier multipliers on free groups. We prove their complete boundedness on non commutative Lp spaces associated with the free group von Neumann algebras for all 1<p<∞. This implies that the decomposition of the free group ∞ into reduced words starting with distinct free generators is completely unconditional in Lp. We study the case of Voiculescu's amalgamated free products of von Neumann algebras as well. As by-products, we obtain a positive answer to a compactness-problem posed by Ozawa, a length independent estimate for Junge-Parcet-Xu's free Rosenthal inequality, a Littlewood-Paley-Stein type inequality for geodesic paths of free groups, and a length reduction formula for Lp-norms of free group von Neumann algebras.