Existence of periodic orbits near heteroclinic connections

Abstract

We consider a potential W:Rm→ R with two different global minima a-, a+ and, under a symmetry assumption, we use a variational approach to show that the Hamiltonian system equation u=Wu(u), 2cm (1) equation has a family of T-periodic solutions uT which, along a sequence Tj→+∞, converges locally to a heteroclinic solution that connects a- to a+. We then focus on the elliptic system equation u=Wu(u),\;\; u:R2→ Rm, 2cm (2) equation that we interpret as an infinite dimensional analogous of (1), where x plays the role of time and W is replaced by the action functional \[JR(u)=∫R(12 uy2+W(u))dy.\] We assume that JR has two different global minimizers u-, u+:R→ Rm in the set of maps that connect a- to a+. We work in a symmetric context and prove, via a minimization procedure, that (2) has a family of solutions uL:R2→ Rm, which is L-periodic in x, converges to a as y→∞ and, along a sequence Lj→+∞, converges locally to a heteroclinic solution that connects u- to u+.