Weighted local estimates for fractional type operators

Abstract

In this note we prove the estimate M0,s(Tf)(x) c\,Mγ f(x) for general fractional type operators T, where M0,s is the local sharp maximal function and Mγ the fractional maximal function, as well as a local version of this estimate. This allows us to express the local weighted control of Tf by Mγ f. Similar estimates hold for T replaced by fractional type operators with kernels satisfying H\"ormander-type conditions or integral operators with homogeneous kernels, and Mγ replaced by an appropriate maximal function MT. We also prove two-weight, Lpv-Lqw estimates for the fractional type operators described above for 1<p< q<∞ and a range of q. The local nature of the estimates leads to results involving generalized Orlicz-Campanato and Orlicz-Morrey spaces.