On weighted Compactness of commutators of bilinear maximal Calder\'on-Zygmund singular integral operators

Abstract

Let T be a bilinear Calder\'on-Zygmund singular integral operator and T* be its corresponding truncated maximal operator. For any b∈BMO( Rn) and b=(b1,\ b2)∈BMO( Rn)× BMO(Rn), let T*b,j (j=1,2), T*b\ be the commutators in the j-th entry and the iterated commutators of T*, respectively. In this paper, for all 1<p1,p2<∞, 1p=1p1+1p2, we show that T*b,j and T*b are compact operators from Lp1(w1)× Lp2(w2) to Lp(vw), if b,b1,b2∈ CMO(Rn) and w=(w1,w2)∈ Ap, vw=w1p/p1w2p/p2. Here CMO(Rn) denotes the closure of Cc∞(Rn) in the BMO(Rn) topology and Ap is the multiple weights class.