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Minimal heteroclinics for a class of fourth order ODE systems

Authordc.contributor.authorSmyrnelis, Panayotis 
Admission datedc.date.accessioned2018-09-27T19:26:51Z
Available datedc.date.available2018-09-27T19:26:51Z
Publication datedc.date.issued2018-08
Cita de ítemdc.identifier.citationNonlinear Analysis 173 (2018) 154–163es_ES
Identifierdc.identifier.other10.1016/j.na.2018.04.003
Identifierdc.identifier.urihttps://repositorio.uchile.cl/handle/2250/151820
Abstractdc.description.abstractWe 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. (C) 2018 Elsevier Ltd. All rights reserved.es_ES
Patrocinadordc.description.sponsorshipFondo Basal CMM-Chile Fondecyt 3160055es_ES
Lenguagedc.language.isoenes_ES
Publisherdc.publisherElsevieres_ES
Type of licensedc.rightsAttribution-NonCommercial-NoDerivs 3.0 Chile*
Link to Licensedc.rights.urihttp://creativecommons.org/licenses/by-nc-nd/3.0/cl/*
Sourcedc.sourceNonlinear Analysises_ES
Keywordsdc.subjectFourth order equationses_ES
Keywordsdc.subjectSystems of ODEes_ES
Keywordsdc.subjectHeteroclinic orbites_ES
Keywordsdc.subjectMinimizeres_ES
Keywordsdc.subjectVariational methodses_ES
Títulodc.titleMinimal heteroclinics for a class of fourth order ODE systemses_ES
Document typedc.typeArtículo de revista
Catalogueruchile.catalogadorrgfes_ES
Indexationuchile.indexArtículo de publicación ISIes_ES


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