Weighted Morrey spaces related to certain nonnegative potentials and Riesz transforms

Abstract

Let L=-+V be a Schr\"odinger operator, where is the Laplacian on Rd and the nonnegative potential V belongs to the reverse H\"older class RHq for q≥ d. The Riesz transform associated with the operator L=-+V is denoted by R=∇(-+V)-1/2 and the dual Riesz transform is denoted by R=(-+V)-1/2∇. In this paper, we first introduce some kinds of weighted Morrey spaces related to certain nonnegative potentials belonging to the reverse H\"older class RHq for q≥ d. Then we will establish the boundedness properties of the operators R and its adjoint R on these new spaces. Furthermore, weighted strong-type estimate and weighted endpoint estimate for the corresponding commutators [b, R] and [b, R] are also obtained. The classes of weights, the classes of symbol functions as well as weighted Morrey spaces discussed in this paper are larger than Ap, BMO( Rd) and Lp,(w) corresponding to the classical Riesz transforms (V0).