Saddle-shaped positive solutions for elliptic systems with bistable nonlinearity

Abstract

In this paper we prove the existence of infinitely many saddle-shaped positive solutions for non-cooperative nonlinear elliptic systems with bistable nonlinearities in the phase-separation regime. As an example, we prove that the system \[ cases - u =u-u3- uv2 - v =v-v3- u2v u,v > 0 cases in RN, with >1, \] has infinitely many saddle-shape solutions in dimension 2 or higher. This is in sharp contrast with the case ∈ (0,1], for which, on the contrary, only constant solutions exist.