Non-degeneracy and local uniqueness of positive solutions to the Lane-Emden problem in dimension two

Abstract

We are concerned with the Lane-Emden problem equation* cases - u=up &in~,\\[0.5mm] u>0 &in~,\\[0.5mm] u=0 &on~∂ , cases equation* where ⊂ R2 is a smooth bounded domain and p>1 is sufficiently large. Improving some known asymptotic estimates on the solutions, we prove the non-degeneracy and local uniqueness of the multi-spikes positive solutions for general domains. Our methods mainly use ODE's theory, various local Pohozaev identities, blow-up analysis and the properties of Green's function.