Sparse domination for rough multilinear singular integrals
Abstract
Let be a function on Rmn , homogeneous of degree zero, and satisfy a cancellation condition on the unit sphere Smn-1. In this paper, we show that the multilinear singular integral operator \[ T(f1, …, fm)(x) := p.v. ∫Rmn (x - y1, …, x - ym)|x - y|mn Πi=1m fi(yi) \, dy, \] associated with a rough kernel ∈ Lr(Smn-1) , r > 1 , admits a sparse domination, where y=(y1,…,ym) and dy=dy1·s dym. As a consequence, we derive some quantitative weighted norm inequalities for T .
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