Compactness Characterizations of Commutators on Ball Banach Function Spaces

Abstract

Let X be a ball Banach function space on Rn. Let be a Lipschitz function on the unit sphere of Rn,which is homogeneous of degree zero and has mean value zero, and let T be the convolutional singular integral operator with kernel (·)/|·|n. In this article, under the assumption that the Hardy--Littlewood maximal operator M is bounded on both X and its associated space, the authors prove that the commutator [b,T] is compact on X if and only if b∈ CMO( Rn). To achieve this, the authors mainly employ three key tools: some elaborate estimates, given in this article, on the norm in X of the commutators and the characteristic functions of some measurable subset,which are implied by the assumed boundedness of M on X and its associated space as well as the geometry of Rn; the complete John--Nirenberg inequality in X obtained by Y. Sawano et al.; the generalized Fr\'echet--Kolmogorov theorem on X also established in this article. All these results have a wide range of applications. Particularly, even when X:=Lp(·)( Rn) (the variable Lebesgue space), X:=Lp( Rn) (the mixed-norm Lebesgue space), X:=L( Rn) (the Orlicz space), and X:=(Eq)t( Rn) (the Orlicz-slice space or the generalized amalgam space), all these results are new.

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