Commutators, Little BMO and Weak Factorization

Abstract

In this paper, we provide a direct and constructive proof of weak factorization of h1(R) (the predual of little BMO space bmo(R×R) studied by Cotlar-Sadosky and Ferguson-Sadosky), i.e., for every f∈ h1(R×R) there exist sequences \αjk\∈1 and functions gjk,hkj∈ L2(R2) such that align* f=Σk=1∞Σj=1∞αkj(\, hkj H1H2 gkj - gkj H1H2 hkj) align* in the sense of h1(R), where H1 and H2 are the Hilbert transforms on the first and second variable, respectively. Moreover, the norm \|f\|h1(R×R) is given in terms of \|gkj\|L2(R2) and \|hkj\|L2(R2). By duality, this directly implies a lower bound on the norm of the commutator [b,H1H2] in terms of \|b\| bmo(R×R). Our method bypasses the use of analyticity and the Fourier transform, and hence can be extended to the higher dimension case in an arbitrary n-parameter setting for the Riesz transforms.