Fractional Bloom boundedness and compactness of commutators

Abstract

Let T be a non-degenerate Calder\'on-Zygmund operator and let b:Rd be locally integrable. Let 1<p≤ q<∞ and let μp∈ Ap and λq∈ Aq, where Ap denotes the usual class of Muckenhoupt weights. We show that align* \|[b,T]\|Lpμ Lqλ \|b\|BMOα, [b,T]∈ K(Lpμ, Lqλ)iff b∈ VMOα, align* where Lpμ=Lp(μp) and α/d = 1/p-1/q, , the symbol K stands for the class of compact operators between the given spaces, and the fractional weighted BMOα and VMOα spaces are defined through the following fractional oscillation and Bloom weight align* Oα(b;Q) = -α/d(Q)(1(Q)∫Q |b- bQ|), = (μλ)β, β = (1+α/d)-1. align* The key novelty is dealing with the off-diagonal range p<q, whereas the case p=q was previously studied by Lacey and Li. However, another novelty in both cases is that our approach allows complex-valued functions b, while other arguments based on the median of b on a set are inherently real-valued.

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