Multilinear fractional maximal and integral operators with homogeneous kernels, Hardy--Littlewood--Sobolev and Olsen-type inequalities
Abstract
Let m∈ N and 0<α<mn.In this paper, we will use the idea of Hedberg to reprove that the multilinear operators T,α;m and M,α;m are bounded from Lp1( Rn)× Lp2( Rn)×·s× Lpm( Rn) into Lq( Rn) provided that =(1,2,…,m)∈ Ls(Sn-1), s'<p1,p2,…,pm<n/α, equation* \,1\,p=1p1+1p2+·s+1pm and \,1\,q=\,1\,p-αn. (*) equation* We also prove that under the assumptions that =(1,2,…,m)∈ Ls(Sn-1), s'≤ p1,p2,…,pm<n/α and (*), the multilinear operators T,α;m and M,α;m are bounded from Lp1( Rn)× Lp2( Rn)× ·s× Lpm( Rn) into Lq,∞( Rn), which are completely new. Moreover, we will use the idea of Adams to show that T,α;m and M,α;m are bounded from Lp1,( Rn)× Lp2,( Rn)× ·s× Lpm,( Rn) into Lq,( Rn) whenever s'<p1,p2,…,pm<n/α, 0<<1, equation* \,1\,p=1p1+1p2+·s+1pm and \,1\,q=\,1\,p-αn(1-), (**) equation* and also bounded from Lp1,( Rn)× Lp2,( Rn)× ·s× Lpm,( Rn) into WLq,( Rn) whenever s'≤ p1,p2,…,pm<n/α, 0<<1 and (**).
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