A note on radial solutions to the critical Lane-Emden equation with a variable coefficient

Abstract

In this note, we consider the following problem, equation* cases - u=(1+g(x))uN+2N-2,\ u>0 in B,\\ u=0 on ∂ B, cases equation* where N3 and B⊂ RN is a unit ball centered at the origin and g(x) is a radial H\"older continuous function such that g(0)=0. We prove the existence and nonexistence of radial solutions by the variational method with the concentration compactness analysis and the Pohozaev identity.