Necessary and sufficient conditions for boundedness of commutators of fractional integral operators on slice spaces

Abstract

Let 0<t<∞, 0<α<n, 1<p<r<∞ and 1<q<s<∞. In this paper, we prove that b∈ B M O(Rn) if and only if the commutator [b, T,α] generated by the fractional integral operator with the rough kernel T,α and the locally integrable function b is bounded from the slice space (Epq)t(Rn) to (Ers)t(Rn). Meanwhile, we also show that b∈ Lipβ(Rn) (0<β<1) if and only if the commutator [b, T,α] is bounded from (Epq)t(Rn) to (Ers)t(Rn).

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