Estimates for Littlewood--Paley Operators on Ball Campanato-Type Function Spaces

Abstract

Let X be a ball quasi-Banach function space on Rn and assume that the Hardy--Littlewood maximal operator satisfies the Fefferman--Stein vector-valued maximal inequality on X, and let q∈[1,∞) and d∈(0,∞). In this article, the authors prove that, for any f∈ LX,q,0,d(Rn) (the ball Campanato-type function space associated with X), the Littlewood--Paley g-function g(f) is either infinite everywhere or finite almost everywhere and, in the latter case, g(f) is bounded on LX,q,0,d(Rn). Similar results for both the Lusin-area function and the Littlewood--Paley gλ*-function are also obtained. All these results have a wide range of applications. Particularly, even when X is the weighted Lebesgue space, or the mixed-norm Lebesgue space, or the variable Lebesgue space, or the Orlicz space, or the Orlicz-slice space, all these results are new. The proofs of all these results strongly depend on several delicate estimates of Littlewood--Paley operators on the mean oscillation of the locally integrable function f on Rn. Moreover, the same ideas are also used to obtain the corresponding results for the special John--Nirenberg--Campanato space via congruent cubes.