Commutators of certain fractional type operators with H\"ormander conditions, one-weighted and two-weighted inequalities

Abstract

In this paper we study the commutators of fractional type integral operators. This operators are given by kernels of theform K(x,y)=k1(x-A1y)k2(x-A2y)… km(x-Amy), where Ai are invertibles matrices and each ki satisfies a fractional size condition and generalized fractional H\"ormander condition. We obtain weighted Coifman estimates, weighted Lp(wp) - Lq(wq) estimates and weighted BMO estimates. We also give a two weight strong estimate for pair of weights of the form (u,Su) where u is an arbitrary non-negative function and S is a maximal operator depending on the smoothness of the kernel K. For the singular case we also give a two-weighted endpoint estimate.