A note on multilinear fractional integrals with rough kernel (Q2767441)

Let \(0<\alpha<n\). The author proves that a class of rough multilinear fractional integral operators and the related maximal operators are both weightedly bounded from \(L^p(w^p)\) (\(1<p<n/\alpha\)) to \(L^q(w^q)\) with \(w\in A(p,q)\) and from \(L^p\) (\(1\leq p<n/\alpha\)) to \(L^{n/(n-\alpha),\infty}\) with power weights, respectively. The author also establishes the same results for the multilinear fractional maximal operators.