Nonradial solutions of nonlinear scalar field equations

Abstract

We prove new results concerning the nonlinear scalar field equation equation* \ arrayll - u = g(u)& in RN,\; N≥ 3, u∈ H1(RN)& array . equation* with a nonlinearity g satisfying the general assumptions due to Berestycki and Lions. In particular, we find at least one nonradial solution for any N≥ 4 minimizing the energy functional on the Pohozaev constraint in a subspace of H1(RN) consisting of nonradial functions. If in addition N≠ 5, then there are infinitely many nonradial solutions. These solutions are sign-changing. The results give a positive answer to a question posed by Berestycki and Lions in [5,6]. Moreover, we build a critical point theory on a topological manifold, which enables us to solve the above equation as well as to treat new elliptic problems.