On analyticity of semigroups on Bochner spaces and on vector-valued noncommutative Lp-spaces

Abstract

We show that the analyticity of semigroups (Tt)t ≥ 0 of (not necessarily positive) selfadjoint contractive Fourier multipliers on Lp-spaces of any abelian locally compact group is preserved by the tensorisation of the identity operator IdX of a Banach space X for a large class of K-convex Banach spaces, answering partially a conjecture of Pisier. The result is even new for semigroups of Fourier multipliers acting on Lp(Rn). The proof relies on the use of noncommutative Banach spaces and we give a more general result for semigroups of Fourier multipliers acting on noncommutative Lp-spaces. Finally, we also give a somewhat different version of this result in the discrete case, i.e. for Ritt operators.