Real-Variable Characterizations of New Anisotropic Mixed-Norm Hardy Spaces

Abstract

Let p∈(0,∞)n and A be a general expansive matrix on Rn. In this article, via the non-tangential grand maximal function, the authors first introduce the anisotropic mixed-norm Hardy spaces HAp(Rn) associated with A and then establish their radial or non-tangential maximal function characterizations. Moreover, the authors characterize HAp(Rn), respectively, by means of atoms, finite atoms, Lusin area functions, Littlewood-Paley g-functions or gλ-functions via first establishing an anisotropic Fefferman-Stein vector-valued inequality on the mixed-norm Lebesgue space Lp(Rn). In addition, the authors also obtain the duality between HAp(Rn) and the anisotropic mixed-norm Campanato spaces. As applications, the authors establish a criterion on the boundedness of sublinear operators from HAp(Rn) into a quasi-Banach space. Applying this criterion, the authors then obtain the boundedness of anisotropic convolutional δ-type and non-convolutional β-order Calder\'on-Zygmund operators from HAp(Rn) to itself [or to Lp(Rn)]. As a corollary, the boundedness of anisotropic convolutional δ-type Calder\'on-Zygmund operators on the mixed-norm Lebesgue space Lp(Rn) with p∈(1,∞)n is also presented.