Boundedness of Intrinsic Littlewood-Paley Functions on Musielak-Orlicz Morrey and Campanato Spaces

Abstract

Let : Rn× [0,∞)[0,∞) be such that (x,·) is nondecreasing, (x,0)=0, (x,t)>0 when t>0, t∞(x,t)=∞ and (·,t) is a Muckenhoupt A∞( Rn) weight uniformly in t. Let φ: [0,∞)[0,∞) be nondecreasing. In this article, the authors introduce the Musielak-Orlicz Morrey space M,φ( Rn) and obtain the boundedness on M,φ( Rn) of the intrinsic Lusin area function Sα, the intrinsic g-function gα, the intrinsic gλ*-function gλ, α and their commutators with BMO() functions, where α∈(0,1], λ∈(\\3,\,p1\,3+2/n\,∞) and p1 denotes the uniformly upper type index of . Let : [0,∞)[0,∞) be nondecreasing, (0)=0, (t)>0 when t>0, and t∞(t)=∞, w∈ A∞( Rn) and φ: (0,∞)(0,∞) be nonincreasing. The authors also introduce the weighted Orlicz-Morrey space Mw,φ( Rn) and obtain the boundedness on Mw,φ( Rn) of the aforementioned intrinsic Littlewood-Paley functions and their commutators with BMO() functions. Finally, for q∈[1,), the boundedness of the aforementioned intrinsic Littlewood-Paley functions on the Musielak Orlicz Campanato space L,q( Rn) is also established.