On the compactness of bi-parameter singular integrals

Abstract

We establish a new T1 theorem for the compactness of bi-parameter Calder\'on-Zygmund singular integral operators. Namely, we show that if a bi-parameter CZO T satisfies the product weak compactness property, the mixed weak compactness/CMO property, and T1, Tt1, Tt1, Ttt1 ∈ CMO(Rn1×Rn2), then T is compact on L2(Rn1×Rn2). We also obtain endpoint compactness results for these operators and use them to deduce the necessity of most of our hypotheses. In particular, our conditions characterize the simultaneous L2(Rn1×Rn2)-compactness of a bi-parameter CZO and its partial transpose. Our assumptions improve upon previously known sufficient conditions, and our proof, which is shorter and simpler than earlier arguments, utilizes a new abstract compactness criterion for partially localized operators on tensor products of Hilbert spaces.