Littlewood-Paley Characterizations of Hardy-type Spaces Associated with Ball Quasi-Banach Function Spaces

Abstract

Let X be a ball quasi-Banach function space on Rn. In this article, assuming that the powered Hardy--Littlewood maximal operator satisfies some Fefferman--Stein vector-valued maximal inequality on X and is bounded on the associated space, the authors establish various Littlewood--Paley function characterizations of the Hardy space HX( Rn) associated with X, under some weak assumptions on the Littlewood--Paley functions. To this end, the authors also establish a useful estimate on the change of angles in tent spaces associated with X. All these results have wide applications. Particularly, when X:=Mrp( Rn) (the Morrey space), X:=Lp( Rn) (the mixed-norm Lebesgue space), X:=Lp(·)( Rn) (the variable Lebesgue space), X:=Lωp( Rn) (the weighted Lebesgue space) and X:=(Er)t( Rn) (the Orlicz-slice space), the Littlewood--Paley function characterizations of HX( Rn) obtained in this article improve the existing results via weakening the assumptions on the Littlewood--Paley functions and widening the range of λ in the Littlewood--Paley gλ*-function characterization of HX( Rn).