Weighted Anisotropic Product Hardy Spaces and Boundedness of Sublinear Operators

Abstract

Let A1 and A2 be expansive dilations, respectively, on Rn and Rm. Let A(A1, A2) and Ap( A) be the class of product Muckenhoupt weights on Rn× Rm for p∈(1, ∞]. When p∈(1, ∞) and w∈ Ap( A), the authors characterize the weighted Lebesgue space Lpw( Rn× Rm) via the anisotropic Lusin-area function associated with A. When p∈(0, 1], w∈ A∞( A), the authors introduce the weighted anisotropic product Hardy space Hpw( Rn× Rm; A) via the anisotropic Lusin-area function and establish its atomic decomposition. Moreover, the authors prove that finite atomic norm on a dense subspace of Hpw( Rn× Rm; A) is equivalent with the standard infinite atomic decomposition norm. As an application, the authors prove that if T is a sublinear operator and maps all atoms into uniformly bounded elements of a quasi-Banach space B , then T uniquely extends to a bounded sublinear operator from Hpw( Rn× Rm; A) to B. The results of this paper improve the existing results for weighted product Hardy spaces and are new even in the unweighted anisotropic setting.