Characterization of weights for the variable fractional maximal operator and weighted inequalities for variable fractional rough operators

Abstract

We characterize the class of weights related to the boundedness of variable fractional maximal operator Mβ(·),r(·) on variable Lebesgue spaces. This extend previously known results, including those corresponding to the fractional operator Mβ(·),1. In addition, we introduce a class of kernels K satisfying a new variable H\"ormander-type condition Hβ(·),r(·). For the fractional operator Tβ(·) given by a kernel in Hβ(·),r(·), we prove a Coifman-Fefferman inequality and weighted inequalities in variable Lebesgue space. Finally, we provide examples of kernels in this variable H\"ormander class.