Existence and nonexistence of entire solutions for non-cooperative cubic elliptic systems

Abstract

In this paper we deal with the cubic Schr\"odinger system - ui = Σj=1n βijuj2 ui, u1,…,un ≥ 0 in RN (N≤ 3), where β=(βi,j)ij is a symmetric matrix with real coefficients and βii≥ 0 for every i=1,…,n. We analyse the existence and nonexistence of nontrivial solutions in connection with the properties of the matrix β, and provide a complete characterization in dimensions N=1,2. Extensions to more general power-type nonlinearities are given.