Least Energy Solutions for Cooperative and Competitive Schr\"odinger Systems with Neumann Boundary Conditions

Abstract

We study the following gradient elliptic system with Neumann boundary conditions equation* - u + λ1 u = u3 + β uv2, \ - v + λ2 v = v3 + β u2 v \ in , ∂ u∂ = ∂ v∂ = 0 \ on ∂ , equation* where ⊂ RN is a bounded C2 domain with N ≤ 4 , and denotes the outward unit normal on the boundary. We investigate the existence of non-constant least energy solutions in both the cooperative (β > 0 ) and the competitive ( β < 0 ) regimes, considering both the definite and the indefinite case, namely λ1,λ2∈ R. We emphasize that our analysis includes both the subcritical case N ≤ 3 and the critical case N = 4 . Depending on the values of β,λ1,λ2, the least energy solution is obtained either via a linking theorem, by minimizing over a suitable Nehari manifold, or by direct minimization on the set of all non-trivial weak solutions. Our results and techniques can be also adapted to cover some previously untreated cases for Dirichlet conditions.