Interpolation of Sobolev spaces, Littlewood-Paley inequalities and Riesz transforms on graphs

Abstract

Let be a graph endowed with a reversible Markov kernel p, and P the associated operator, defined by Pf(x)=Σy p(x,y)f(y). Denote by ∇ the discrete gradient. We give necessary and/or sufficient conditions on in order to compare ∇ f p and (I-P)1/2f p uniformly in f for 1<p<+∞. These conditions are different for p<2 and p>2. The proofs rely on recent techniques developed to handle operators beyond the class of Calder\'on-Zygmund operators. For our purpose, we also prove Littlewood-Paley inequalities and interpolation results for Sobolev spaces in this context, which are of independent interest.