Compactness of commutators of rough singular integrals

Abstract

We study the two-weighted off-diagonal compactness of commutators of rough singular integral operators T that are associated with a kernel ∈ Lq(Sd-1). We establish a characterisation of compactness of the commutator [b,T] in terms of the function b belonging to a suitable space of functions with vanishing mean oscillation. Our results expand upon the previous compactness characterisations for Calder\'on-Zygmund operators. Additionally, we prove a matrix-weighted compactness result for [b,T] by applying the so-called matrix-weighted Kolmogorov-Riesz theorem.

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