The Calder\'on operator and the Stieltjes transform on variable Lebesgue spaces with weights

Abstract

We characterize the weights for the Stieltjes transform and the Calder\'on operator to be bounded on the weighted variable Lebesgue spaces Lwp(·)(0,∞), assuming that the exponent function p(·) is log-H\"older continuous at the origin and at infinity. We obtain a single Muckenhoupt-type condition by means of a maximal operator defined with respect to the basis of intervals \ (0,b) : b>0\ on (0,∞). Our results extend those in DMRO1 for the constant exponent Lp spaces with weights. We also give two applications: the first is a weighted version of Hilbert's inequality on variable Lebesgue spaces, and the second generalizes the results in SW for integral operators to the variable exponent setting.