Families of functionals representing Sobolev norms

Abstract

We obtain new characterizations of the Sobolev spaces W1,p(RN) and the bounded variation space BV(RN). The characterizations are in terms of the functionals γ (Eλ,γ/p[u]) where \[ Eλ,γ/p[u]= \(x,y )∈ RN × RN x ≠ y, \, |u(x)-u(y)||x-y|1+γ/p>λ\ \] and the measure γ is given by d γ(x,y)=|x-y|γ-N d x d y. We provide characterizations which involve the Lp,∞-quasi-norms λ>0 λ \, γ (Eλ,γ/p[u]) 1/p and also exact formulas via corresponding limit functionals, with the limit for λ∞ when γ>0 and the limit for λ 0+ when γ<0. The results unify and substantially extend previous work by Nguyen and by Brezis, Van Schaftingen and Yung. For p>1 the characterizations hold for all γ ≠ 0. For p=1 the upper bounds for the L1,∞ quasi-norms fail in the range γ∈ [-1,0) ; moreover in this case the limit functionals represent the L1 norm of the gradient for C∞c-functions but not for generic W1,1-functions. For this situation we provide new counterexamples which are built on self-similar sets of dimension γ+1. For γ=0 the characterizations of Sobolev spaces fail; however we obtain a new formula for the Lipschitz norm via the expressions 0(Eλ,0[u]).