Bloom Type Inequality: The Off-diagonal Case

Abstract

In this paper, we establish a representation formula for fractional integrals. As a consequence, for two fractional integral operators Iλ1 and Iλ2, we prove a Bloom type inequality align* to 8em& -8em \|[Iλ11,[b,Iλ22]] \|Lp2(Lp1)(μ2p2×μ1p1)→ Lq2(Lq1)(σ2q2×σ1q1) % \\ %& [μ1]Ap1,q1( Rn),[μ2]Ap2,q2( Rm) \\ [σ1]Ap1,q1( Rn),[σ2]Ap2,q2( Rm) \|b\|_(), align* where the indices satisfy 1<p1<q1<∞, 1<p2<q2<∞, 1/q1+1/p1'=λ1/n and 1/q2+1/p2'=λ2/m, the weights μ1,σ1 ∈ Ap1,q1( Rn), μ2,σ2 ∈ Ap2,q2( Rm) and :=μ1σ1-1 μ2σ2-1, Iλ11 stands for Iλ1 acting on the first variable and Iλ22 stands for Iλ2 acting on the second variable, prod() is a weighted product space and Lp2(Lp1)(μ2p2×μ1p1) and Lq2(Lq1)(σ2q2×σ1q1) are mixed-norm spaces.