Infinitely many non-radial solutions to a critical equation on annulus

Abstract

In this paper, we build infinitely many non-radial sign-changing solutions to the critical problem: equation* \arrayrlll - u&=|u|4N-2u, & in ,\\ u&=0, & on ∂. array. (P) equation* on the annulus :=\x∈ RN: a<|x|<b\, N≥ 3. In particular, for any integer k large enough, we build a non-radial solution which look like the unique positive solution u0 to (P) crowned by k negative bubbles arranged on a regular polygon with radius r0 such that r0N-22u0(r0)=:a≤ r≤ brN-22u0(r).