On the heteroclinic connection problem for multi-well gradient systems
Abstract
We revisit the existence problem of heteroclinic connections in associated with Hamiltonian systems involving potentials having several global minima. Under very mild assumptions on we present a simple variational approach to first find geodesics minimizing length of curves joining any two of the potential wells, where length is computed with respect to a degenerate metric having conformal factor Then we show that when such a minimizing geodesic avoids passing through other wells of the potential at intermediate times, it gives rise to a heteroclinic connection between the two wells. This work improves upon the approach of P.Sternberg in , and represents a more geometric alternative to the approaches for finding such connections described, for example, by N.D. Alikakos and G.Fusco in , by S.V. Bolotin in , by J. Byeon, P. Montecchiari, and P. Rabinowitz in , and by P. Rabinowitz in .
Keywords
Cite
@article{arxiv.1604.03645,
title = {On the heteroclinic connection problem for multi-well gradient systems},
author = {Andres Zuniga and Peter Sternberg},
journal= {arXiv preprint arXiv:1604.03645},
year = {2019}
}
Comments
19 pages, 3 figures. KEYWORDS: heteroclinic orbits, multi-well potentials, minimizing geodesics