A Nonlinear Elliptic PDE with Two Sobolev-Hardy Critical Exponents

Abstract

In this paper, we consider the following PDE involving two Sobolev-Hardy critical exponents, 0.1 & u + λu2*(s1)-1|x|s1 + u2*(s2)-1|x|s2 =0 in , & u=0 on , where 0 s2 < s1 2, 0 λ ∈ R and 0 ∈ ∂ . The existence (or nonexistence) for least-energy solutions has been extensively studied when s1=0 or s2=0. In this paper, we prove that if 0< s2 < s1 <2 and the mean curvature of ∂ at 0 H(0)<0, then 0.1 has a least-energy solution. Therefore, this paper has completed the study of 0.1 for the least-energy solutions. We also prove existence or nonexistence of positive entire solutions of 0.1 with = under different situations of s1, s2 and λ.