An optimal bound on the number of interior spike solutions for Lin-Ni-Takagi problem

Abstract

We consider the following singularly perturbed Neumann problem eqnarray* 2 u -u +up = 0 in , u>0 in , ∂ u ∂ =0 on ∂ , eqnarray* where p is subcritical and is a smooth and bounded domain in n with its unit outward normal . Lin-Ni-Wei LNW proved that there exists 0 such that for 0<<0 and for each integer k bounded by equation 1≤ k≤ δ(,n,p)( | |)n equation where δ(,n,p) is a constant depending only on , p and n, there exists a solution with k interior spikes. We show that the bound on k can be improved to equation 1≤ k≤ δ(,n,p)n, equation which is optimal.