Sharp estimates and non-degeneracy of low energy nodal solutions for the Lane-Emden equation in dimension two

Abstract

We study the Lane-Emden problem \[cases - up =|up|p-1up&in , up=0 &on∂, cases\] where ⊂ R2 is a smooth bounded domain and p>1 is sufficiently large. We obtain sharp estimates and non-degeneracy of low energy nodal solutions up (i.e. nodal solutions satisfying p+∞p∫|up|p+1dx=16π e). As applications, we prove that the comparable condition p(\|up+\|∞-\|up-\|∞)=O(1) holds automatically for least energy nodal solutions, which confirms a conjecture raised by (Grossi-Grumiau-Pacella, Ann.I.H. Poincare-AN, 30 (2013), 121-140) and (Grossi-Grumiau-Pacella, J.Math.Pures Appl. 101 (2014), 735-754).