Minimal heteroclinics for a class of fourth order O.D.E. systems
classification
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systemsclassfourthheteroclinicminimalorbitsordercomponents
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We prove the existence of minimal heteroclinic orbits for a class of fourth order O.D.E. systems with variational structure. In our general set-up, the set of equilibria of these systems is a union of manifolds, and the heteroclinic orbits connect two disjoint components of this set.
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