Weighted estimates for Multilinear Singular Integrals with Rough Kernels

Abstract

We establish weighted norm inequalities for multilinear singular integral operators with rough kernels. Specifically, we consider the multilinear singular integral operator LΩ associated with an integrable function Ω on the unit sphere Smn-1 satisfying the vanishing mean condition. Extending the classical results of Watson and Duoandikoetxea to the multilinear setting, we prove that LΩ is bounded from Lp1(w1)×·s× Lpm(wm) to Lp(vw) under the assumption that Ω∈ Lq(Smn-1) and that the m tuple of weights w= (w1,…,wm) lies in the multiple weight class Ap/q'((Rn)m). Here, q' denotes the Hölder conjugate of q, and we assume q' p1,…,pm<∞ with 1/p = 1/p1 + ·s + 1/pm.