H\"ormander Functional Calculus for Poisson Estimates

Abstract

The aim of the article is to show a H\"ormander spectral multiplier theorem for an operator A whose kernel of the semigroup (-zA) satisfies certain Poisson estimates for complex times z. Here (-zA) acts on Lp(),\,1 < p < ∞, where is a space of homogeneous type with the additional condition that the measure of annuli is controlled. In most of the known H\"ormander type theorems in the literature, Gaussian bounds and self-adjointness for the semigroup are needed, whereas here the new feature is that the assumptions are the to some extend weaker Poisson bounds, and calculus in place of self-adjointness. The order of derivation in our H\"ormander multiplier result is typically d2, d being the dimension of the space . Moreover the functional calculus resulting from our H\"ormander theorem is shown to be R-bounded. Finally, the result is applied to some examples.