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. The commutators in the i-th entry and the iterated commutators of T* are defined by T,b,1(f,g)(x)=δ>0||x-y|+|x-z|>δK(x,y,z)(b(y)-b(x))f(y)g(z)dydz|, T,b,2(f,g)(x)=δ>0||x-y|+|x-z|>δK(x,y,z)(b(z)-b(x))f(y)g(z)dydz|, align* T,(b1,b2)(f,g)(x)=δ>0||x-y|+|x-z|>δ K(x,y,z)(b1(y)-b1(x))(b2(z)-b2(x))f(y)g(z)dydz|. align* In this paper, the compactness of the commutators T,b,1, T,b,2 and T,(b1,b2) on Lr(Rn)) is established.