Heteroclinic solutions between stationary points at different energy levels
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Heteroclinic solutions, variational methods, Lagrangian systemsAbstrakt
Consider the system of equations $$ -\ddot{q} = a(t)V'(q). $$ The main goal of this paper is to present a simple minimization method to find heteroclinic connections between isolated critical points of $V$, say $0$ and $\xi$, which are local maxima but do not necessarily have the same value of $V$. In particular we prove that there exist heteroclinic solutions from $0$ to $\xi$ and from $\xi$ to $0$ for a class of positive slowly oscillating periodic functions $a$ provided $\delta = |V(0) - V(\xi)|$ is sufficiently small (and another technical condition is satisfied). Note that when $V(0) \neq V(\xi)$, $a$ cannot be constant be conservation of energy. Existence of ``multi-bump'' solutions is also proved.Pobrania
Opublikowane
2001-03-01
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COTI ZELATI, Vittorio & RABINOWITZ, Paul H. Heteroclinic solutions between stationary points at different energy levels. Topological Methods in Nonlinear Analysis [online]. 1 marzec 2001, T. 17, nr 1, s. 1–21. [udostępniono 6.7.2025].
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