Dilations of markovian semigroups of Fourier multipliers on locally compact groups

Abstract

We prove that any weak* continuous semigroup (Tt)t ≥ 0 of Markov Fourier multipliers acting on a group von Neumann algebra VN(G) associated to a locally compact group G can be dilated by a weak* continuous group of Markov *-automorphisms on a bigger von Neumann algebra. Our construction relies on probabilistic tools and is even new for the group Rn. Our results imply the boundedness of the McIntosh's H∞ functional calculus of the generators of these semigroups on the associated noncommutative Lp-spaces.