Schr\"odinger operators with reverse H\"older class potentials in the Dunkl setting and their Hardy spaces

Abstract

For a normalized root system R in RN and a multiplicity function k≥ 0 let N=N+Σα ∈ R k(α). Let L=- +V, V≥ 0, be the Dunkl--Schr\"odinger operator on RN. Assume that there exists q >(1,N2) such that V belongs to the reverse H\"older class RHq(dw). We prove the Fefferman--Phong inequality for L. As an application, we conclude that the Hardy space H1L, which is originally defined by means of the maximal function associated with the semigroup etL, admits an atomic decomposition with local atoms in the sense of Goldberg, where their localization are adapted to V.