Exact behavior around isolated singularity for semilinear elliptic equations with a log-type nonlinearity

Abstract

We study the semilinear elliptic equation equation* - u=uα | u|β B1\0\, equation* where B1⊂Rn with n≥ 3, nn-2 < α < n+2n-2 and -∞<β<∞. Our main result establishes that nonnegative solution u∈ C2(B1\0\) of the above equation either has a removable singularity at the origin or behaves like equation* u(x) = A(1+o(1)) |x|-2α-1 ( 1|x|)-βα-1 x→ 0, equation* with equation* A=[(2α-1)1-β(n-2-2α-1)]1α-1. equation*