Complete boundedness of the Heat Semigroups on the von Neumann Algebra of hyperbolic groups

Abstract

We prove that (λg e-t|g|rλg)t>0 defines a completely bounded semigroup of multipliers on the von Neuman algebra of hyperbolic groups for all real number r. One ingredient in the proof is the observation that a construction of Ozawa allows to characterize the radial multipliers that are bounded on every hyperbolic graph, partially generalizing results of Haagerup--Steenstrup--Szwarc and Wysocza\'nski. Another ingredient is an upper estimate of trace class norms for Hankel matrices, which is based on Peller's characterization of such norms.