New oscillation classes and two weight bump conditions for commutators

Abstract

In this paper we consider two weight bump conditions for higher order commutators. Given b and a Calder\'on-Zygmund operator T, define the commutator T1bf=[T,b]f= bTf-T(bf), and for m≥ 2 define the iterated commutator Tmb f = [b,Tbm-1]f. Traditionally, commutators are defined for functions b∈ BMO, but we show that if we replace BMO by an oscillation class first introduced by P\'erez [31], we can give a range of sufficient conditions on a pair of weights (u,v) for Tmb : Lp(v)→ Lp(u) to be bounded. Our results generalize work of the first two authors in [10], and more recent work by Lerner, et al. [28]. We also prove necessary conditions for the iterated commutators to be bounded, generalizing results of Isralowitz, et al.[20].