Exact Morse index computation for nodal radial solutions of Lane-Emden problems

Abstract

We consider the semilinear Lane-Emden problem equationproblemAbstract \arraylr- u= |u|p-1u in B u=0 on ∂ B array. Ep equation where B is the unit ball of RN, N≥2, centered at the origin and 1<p<pS, with pS=+∞ if N=2 and pS=N+2N-2 if N≥3. Our main result is to prove that in dimension N=2 the Morse index of the least energy sign-changing radial solution up of problemAbstract is exactly 12 if p is sufficiently large. As an intermediate step we compute explicitly the first eigenvalue of a limit weighted problem in RN in any dimension N≥2.