H\"ormander functional calculus on UMD lattice valued Lp spaces under generalised Gaussian estimates

Abstract

We consider self-adjoint semigroups Tt = (-tA) acting on L2() and satisfying (generalised) Gaussian estimates, where is a metric measure space of homogeneous type of dimension d. The aim of the article is to show that A IdY admits a H\"ormander type Hβ2 functional calculus on Lp(;Y) where Y is a UMD lattice, thus extending the well-known H\"ormander calculus of A on Lp(). We show that if Tt is lattice positive (or merely admits an H∞ calculus on Lp(;Y)) then this is indeed the case. Here the derivation exponent has to satisfy β > α · d + 12, where α ∈ (0,1) depends on p, and on convexity and concavity exponents of Y. A part of the proof is the new result that the Hardy-Littlewood maximal operator is bounded on Lp(;Y). Moreover, our spectral multipliers satisfy square function estimates in Lp(;Y). In a variant, we show that if eitA satisfies a dispersive L1() L∞() estimate, then β > d+12 above is admissible independent of convexity and concavity of Y. Finally, we illustrate these results in a variety of examples.