Uniqueness and nondegeneracy of sign-changing radial solutions to an almost critical elliptic problem

Abstract

We study sign-changing radial solutions for the following semi-linear elliptic equation align* u-u+|u|p-1u=0in\ RN, u∈ H1(RN), align* where 1<p<N+2N-2, N≥3. It is well-known that this equation has a unique positive radial solution and sign-changing radial solutions with exactly k nodes. In this paper, we show that such sign-changing radial solution is also unique when p is close to N+2N-2. Moreover, those solutions are non-degenerate, i.e., the kernel of the linearized operator is exactly N-dimensional.