Weighted bounds for a class of singular integral operators in variable exponent Herz-Morrey spaces

Abstract

Let T be the singular integral operator with variable kernel defined by Tf(x)= p.v. ∫RnK(x,x-y)f(y)dy and Dγ(0≤γ≤1) be the fractional differentiation operator, where K(x,z)=(x,z')|z|n, z'=z|z|,~~z≠0. Let ~T~and ~T~ be the adjoint of T and the pseudo-adjoint of T, respectively. In this paper, via the expansion of spherical harmonics and the estimates of the convolution operators Tm,j, we shall prove some boundedness results for TDγ-DγT and (T-T)Dγ under natural regularity assumptions on the exponent function on a class of generalized Herz-Morrey spaces with weight and variable exponent, which extend some known results. Moreover, various norm characterizations for the product T1T2 and the pseudo-product T1 T2 are also established.