A Nonlinear Elliptic PDE with Two Sobolev-Hardy Critical Exponents
arXiv:1102.4134 · doi:10.1007/s00205-011-0467-2
Abstract
In this paper, we consider the following PDE involving two Sobolev-Hardy critical exponents, \label{0.1} {& Îu + λ\frac{u^{2^*(s_1)-1}}{|x|^{s_1}} + \frac{u^{2^*(s_2)-1}}{|x|^{s_2}} =0 \text{in} Ω, & u=0 \qquad \text{on} Ω, where $0 \le s_2 < s_1 \le 2$, $0 \ne λ\in \Bbb R$ and $0 \in \partial Ω$. The existence (or nonexistence) for least-energy solutions has been extensively studied when $s_1=0$ or $s_2=0$. In this paper, we prove that if $0< s_2 < s_1 <2$ and the mean curvature of $\partial Ω$ at 0 $H(0)<0$, then \eqref{0.1} has a least-energy solution. Therefore, this paper has completed the study of \eqref{0.1} for the least-energy solutions. We also prove existence or nonexistence of positive entire solutions of \eqref{0.1} with $Ω=\rn$ under different situations of $s_1, s_2$ and $λ$.