Torsion functions and the Cheeger problem: a fractional approach

Abstract

Let be a Lipschitz bounded domain of RN , N≥2. The fractional Cheeger constant hs (), 0<s<1, is defined by \[hs()=∈fE⊂Ps(E)|E|,\: where \: Ps (E)=∫RN ∫RN |E(x)-E(y)||x-y|N+s dx dy,\] with E denoting the characteristic function of the smooth subdomain E. The main purpose of this paper is to show that \[p→1+|φps|L∞()1-p=hs ()=p→1+|φps|L1()1-p,\] where φps is the fractional (s,p)-torsion function of , that is, the solution of the Dirichlet problem for the fractional p-Laplacian: -()ps\,u=1 in , u=0 in RN . For this, we derive suitable bounds for the first eigenvalue λ1,ps() of the fractional p-Laplacian operator in terms of φps. We also show that φps minimizes the (s,p)-Gagliardo seminorm in RN , among the functions normalized by the L1-norm.