The dual of the Hardy space associated to the Dunkl-Schrödinger operator with reverse Hölder class potential

Abstract

Let Lk = -Δk + V be a Schrödinger operator associated with the Dunkl Laplacian Δk, where V is the non-negative potential function belonging to the reverse Hölder class RHkq(Rn) with q> \1, n+2γ2\. Here, 2γ denotes the degree of homogeneity of the weight function wk, which is determined by the normalized root system and the non-negative multiplicity function k. In this paper, we investigate the dual space of the Hardy space HLk1 associated with the Dunkl-Schrödinger operator. The dual space BMO(Lk) is a subspace of the BMOk space, which is the Dunkl analogue of the classical BMO(L) space. We provide a characterization for the BMO(Lk) space. The duality result is obtained via the atomic decomposition of HLk1, where the cancellation condition of atoms depends on the critical radius function associated with the potential V. Finally, we establish the boundedness of the uncentered maximal function on the space BMO(Lk).