Asymptotic behavior of least energy nodal solutions for biharmonic Lane-Emden problems in dimension four

Abstract

In this paper, we study the asymptotic behavior of least energy nodal solutions up(x) to the following fourth-order elliptic problem \[ cases 2 u =|u|p-1u &in\;, \\ u=∂ u∂ =0 \ \ &on\;∂, cases \] where is a bounded C4,α domain in R4 and p>1. Among other things, we show that up to a subsequence of p+∞, pup(x) 64π2e(G(x,x+)-G(x,x-)), where x+≠ x-∈ and G(x,y) is the corresponding Green function of 2. This generalize those results for - u=|u|p-1u in dimension two by (Grossi-Grumiau-Pacella, Ann.I.H.Poincar\'e-AN, 30 (2013), 121-140) to the biharmonic case, and also gives an alternative proof of Grossi-Grumiau-Pacella's results without assuming their comparable condition p(\|up+\|∞-\|up-\|∞)=O(1).