Riesz Transform Characterization of Hardy Spaces Associated with Ball Quasi-Banach Function Spaces

Abstract

Let X be a ball quasi-Banach function space satisfying some mild assumptions and HX(Rn) the Hardy space associated with X. In this article, the authors introduce both the Hardy space HX(Rn+1+) of harmonic functions and the Hardy space HX(Rn+1+) of harmonic vectors, associated with X, and then establish the isomorphisms among HX(Rn), HX,2(Rn+1+), and HX,2(Rn+1+), where HX,2(Rn+1+) and HX,2(Rn+1+) are, respectively, certain subspaces of HX(Rn+1+) and HX(Rn+1+). Using these isomorphisms, the authors establish the first order Riesz transform characterization of HX(Rn). The higher order Riesz transform characterization of HX(Rn) is also obtained. The results obtained in this article have a wide range of generality and can be applied to the classical Hardy space, the weighted Hardy space, the Herz-Hardy space, the Lorentz-Hardy space, the variable Hardy space, the mixed-norm Hardy space, the local generalized Herz-Hardy space, and the mixed-norm Herz-Hardy space.