Littlewood-Paley Characterizations of Fractional Sobolev Spaces via Averages on Balls

Abstract

In this paper, the authors characterize Sobolev spaces Wα,p( Rn) with the smoothness order α∈(0,2] and p∈(\1, 2n2α+n\,∞), via the Lusin area function and the Littlewood-Paley gλ-function in terms of centered ball averages. The authors also show that the condition p∈(\1, 2n2α+n\,∞) is nearly sharp in the sense that these characterizations are no longer true when p∈ (1,\1, 2n2α+n\). These characterizations provide a new possible way to introduce fractional Sobolev spaces with smoothness order in (1,2] on metric measure spaces.