A new estimate for homogeneous fractional integral operators on the weighted Morrey space Lp, when α p=(1-)n
Abstract
For any 0<α<n, the homogeneous fractional integral operator T,α is defined by equation* T,αf(x)=∫ Rn(x-y)|x-y|n-αf(y)\,dy. equation* In this paper, we prove that if satisfies certain Dini smoothness conditions on Sn-1, then T,α is bounded from Lp,(wp,wq) (weighted Morrey space) to BMO( Rn).
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