Stable domains for higher order elliptic operators

Abstract

This paper is devoted to prove that any domain satisfying a (δ0,r0)-capacity condition of first order is automatically (m,p)-stable for all m≥slant 1 and p≥slant 1, and for any dimension N≥slant 1. In particular, this includes regular enough domains such as C1-domains, Lipchitz domains, Reifenberg flat domains, but is weak enough to also includes cusp points. Our result extends some of the results of Hayouni and Pierre valid only for N=2,3, and extends also the results of Bucur and Zolesio for higher order operators, with a different and simpler proof.