Morse index and sign changing bubble towers for Lane-Emden problems

Abstract

We consider the semilinear Lane-Emden problem equationproblemAbstract\ arraylr - u= |u|p-1u in \\ u=0 on ∂ array . Ep equation where p>1 and is a smooth bounded symmetric domain of R2. We show that for families (up) of sign-changing symmetric solutions of problemAbstract an upper bound on their Morse index implies concentration of the positive and negative part, up, at the same point, as p+∞. Then an asymptotic analysis of up+ and up- shows that the asymptotic profile of (up), as p+∞, is that of a tower of two different bubbles.