Commutator Theorems for Fractional Integral Operators on Weighted Morrey Spaces
Abstract
Let L be the infinitesimal generator of an analytic semigroup on L2(Rn) with Gaussican kernel bounds, and let L-α/2 be the fractional integrals of L for 0<α<n. For any locally integrable function b, The commutators associated with L-α/2 are defined by [b,L-α/2](f)(x)=b(x)L-α/2(f)(x)-L-α/2(bf)(x). When b∈ BMO(ω)(weighted BMO space) or b∈ BMO, the author obtain the necessary and sufficient conditions for the boundedness of [b,L-α/2] on weighted Morrey spaces respectively.
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