Square functions and spectral multipliers for Bessel operators in UMD spaces

Abstract

In this paper we consider square functions (also called Littlewood-Paley g-functions) associated to Hankel convolutions acting on functions in the Bochner-Lebesgue space Lp((0,∞),B), where B is a UMD Banach space. As special cases we study square functions defined by fractional derivatives of the Poisson semigroup for the Bessel operator λ=-x-λddxx2λddxx-λ, λ >0. We characterize the UMD property for a Banach space B by using Lp((0,∞),B)-boundedness properties of g-functions defined by Bessel-Poisson semigroups. As a by product we prove that the fact that the imaginary power λ iw, w∈ R\0\, of the Bessel operator λ is bounded in Lp ((0,∞),B), 1<p<∞, characterizes the UMD property for the Banach space B. As applications of our results for square functions we establish the boundedness in Lp((0,∞),B) of spectral multipliers m(λ) of Bessel operators defined by functions m which are holomorphic in sectors .