Nodal Solutions for sublinear-type problems with Dirichlet boundary conditions

Abstract

We consider nonlinear second order elliptic problems of the type \[ - u=f(u) in , u=0 on ∂ , \] where is an open C1,1-domain in RN, N≥ 2, under some general assumptions on the nonlinearity that include the case of a sublinear pure power f(s)=|s|p-1s with 0<p<1 and of Allen-Cahn type f(s)=λ(s-|s|p-1s) with p>1 and λ>λ2() (the second Dirichlet eigenvalue of the Laplacian). We prove the existence of a least energy nodal (i.e. sign changing) solution, and of a nodal solution of mountain-pass type. We then give explicit examples of domains where the associated levels do not coincide. For the case where is a ball or annulus and f is of class C1, we prove instead that the levels coincide, and that least energy nodal solutions are nonradial but axially symmetric functions. Finally, we provide stronger results for the Allen-Cahn type nonlinearities in case is either a ball or a square. In particular we give a complete description of the solution set for λ λ2(), computing the Morse index of the solutions.