Sharp asymptotic profiles for singular solutions to an elliptic equation with a sign-changing nonlinearity

Abstract

Given B1(0) the unit ball of Rn (n≥ 3), we study smooth positive singular solutions u∈ C2(B1(0) \0\) to - u=u2(s)-1|x|s-μ uq. Here 0< s<2, 2(s):=2(n-s)/(n-2) is critical for Sobolev embeddings, q>1 and μ> 0. When μ=0 and s=0, the profile at the singularity 0 was fully described by Caffarelli-Gidas-Spruck. We prove that when μ>0 and s>0, besides this profile, two new profiles might occur. We provide a full description of all the singular profiles. Special attention is accorded to solutions such that x 0|x|n-22u(x)=0 and x 0|x|n-22u(x)∈ (0,+∞). The particular case q=(n+2)/(n-2) requires a separate analysis which we also perform.