High energy sign-changing solutions for Coron's problem

Abstract

We study the existence of sign changing solutions to the following problem (P) \ arrayll u+|u|p-1u=0 & in ε; u=0 & on ∂ ε, array . where p=n+2n-2 is the critical Sobolev exponent and ε is a bounded smooth domain in Rn, n≥ 3, with the form ε= B(0,ε) with a smooth bounded domain containing the origin 0 and B(0,ε) the ball centered at the origin with radius ε >0. We construct a new type of sign-changing solutions with high energy to problem (P), when the parameter ε is small enough.