Weighted norm inequalities for multisublinear maximal operator in martingale spaces
Abstract
Let v,~ω1, ~ω2 be weights and 1<p1, ~p2<∞. Suppose that 1p=1p1+1p2 and (ω1, ω2)∈ RH(p1, p2). For the multisublinear maximal operator M in martingale spaces, we characterize the weights for which M is bounded from Lp1(ω1)× Lp2(ω2) to Lp,∞(v)orLp(v). If v=ω2pp2ω2pp2, we partially give the bilinear version of one-weight theory.
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