Existence and symmetry results for competing variational systems

Abstract

In this paper we consider a class of gradient systems of type -ci ui + Vi(x)ui=Pui(u), u1,..., uk>0 in, u1=...=uk=0 on ∂ , in a bounded domain ⊂eq N. Under suitable assumptions on Vi and P, we prove the existence of ground-state solutions for this problem. Moreover, for k=2, assuming that the domain and the potentials Vi are radially symmetric, we prove that the ground state solutions are foliated Schwarz symmetric with respect to antipodal points. We provide several examples for our abstract framework.