Littlewood-Paley Characterizations of Hajasz-Sobolev and Triebel-Lizorkin Spaces via Averages on Balls

Abstract

Let p∈(1,∞) and q∈[1,∞). In this article, the authors characterize the Triebel-Lizorkin space Fαp,q(Rn) with smoothness order α∈(0,2) via the Lusin-area function and the gλ*-function in terms of difference between f(x) and its average Btf(x):=1|B(x,t)|∫B(x,t)f(y)\,dy over a ball B(x,t) centered at x∈Rn with radius t∈(0,1). As an application, the authors obtain a series of characterizations of Fαp,∞(Rn) via pointwise inequalities, involving ball averages, in spirit close to Hajasz gradients, here an interesting phenomena naturally appears that, in the end-point case when α =2, these pointwise inequalities characterize the Triebel-Lizorkin spaces F2p,2(Rn), while not F2p,∞(Rn). In particular, some new pointwise characterizations of Hajasz-Sobolev spaces via ball averages are obtained. Since these new characterizations only use ball averages, they can be used as starting points for developing a theory of Triebel-Lizorkin spaces with smoothness orders not less than 1 on spaces of homogeneous type.