Extension of Multilinear Fractional Integral Operators to Linear Operators on Lebesgue Spaces with Mixed Norms

Abstract

In [C. E. Kenig and E. M. Stein, Multilinear estimates and fractional integration, Math. Res. Lett., 6(1):1-15, 1999], the following type of multilinear fractional integral \[ ∫Rmn f1(l1(x1,…,xm,x))·s fm+1(lm+1(x1,…,xm,x))(|x1|+…+|xm|)λ dx1… dxm \] was studied, where li are linear maps from R(m+1)n to Rn satisfying certain conditions. They proved the boundedness of such multilinear fractional integral from Lp1× … × Lpm+1 to Lq when the indices satisfy the homogeneity condition. In this paper, we show that the above multilinear fractional integral extends to a linear operator for functions in the mixed-norm Lebesgue space L p which contains Lp1× … × Lpm+1 as a subset. Under less restrictions on the linear maps li, we give a complete characterization of the indices p, q and λ for which such an operator is bounded from L p to Lq. And for m=1 or n=1, we give necessary and sufficient conditions on (l1, …, lm+1), p=(p1,…, pm+1), q and λ such that the operator is bounded.