Weak Hardy-Type Spaces Associated with Ball Quasi-Banach Function Spaces II: Littlewood--Paley Characterizations and Real Interpolation

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 as well as it is bounded on both the weak ball quasi-Banach function space WX and the associated space, the authors establish various Littlewood--Paley function characterizations of WHX( Rn) under some weak assumptions on the Littlewood--Paley functions. The authors also prove that the real interpolation intermediate space (HX( Rn),L∞( Rn))θ,∞, between the Hardy space associated with X, HX( Rn), and the Lebesgue space L∞( Rn), is WHX1/(1-θ)( Rn), where θ∈ (0, 1). All these results are of wide applications. Particularly, when X:=Mqp( Rn) (the Morrey space), X:=Lp( Rn) (the mixed-norm Lebesgue space) and X:=(Eq)t( Rn) (the Orlicz-slice space), all these results are even new; when X:=Lω( Rn) (the weighted Orlicz space), the result on the real interpolation is new and, when X:=Lp(·)( Rn) (the variable Lebesgue space) and X:=Lω( Rn), the Littlewood--Paley function characterizations of WHX( Rn) obtained in this article improves the existing results via weakening the assumptions on the Littlewood--Paley functions.