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dc.creatorAyala-Hoffmann, José
dc.creatorCorbin, Patrick
dc.creatorMcConville, Kelly
dc.creatorColonius, Fritz
dc.creatorKliemann, Wolfgang
dc.creatorPeters, Justin R.
dc.date2017-05-08
dc.identifierhttps://www.revistaproyecciones.cl/index.php/proyecciones/article/view/1551
dc.identifier10.4067/S0716-09172006000100006
dc.descriptionThe global behavior of a dynamical system can be described by its Morse decompositions or its attractor and repeller configurations. There is a close relation between these two approaches and also with (maximal) chain recurrent sets that describe the system behavior on finest Morse sets. These sets depend upper semicontinuously on parameters. The connection with ergodic theory is provided through the construction of invariant measures based on chains.es-ES
dc.publisherUniversidad Católica del Norte.en-US
dc.rightsCopyright (c) 2006 Proyecciones. Journal of Mathematicsen-US
dc.sourceProyecciones (Antofagasta, On line); Vol. 25 No. 1 (2006); 79-109en-US
dc.sourceProyecciones. Revista de Matemática; Vol. 25 Núm. 1 (2006); 79-109es-ES
dc.source0717-6279
dc.subjectMorse decompositiones-ES
dc.subjectattractorses-ES
dc.subjectrepellerses-ES
dc.subjectchainses-ES
dc.subjectinvariantses-ES
dc.subjectdescomposición Morsees-ES
dc.subjectatractoreses-ES
dc.subjectrepulsoreses-ES
dc.subjectcadenases-ES
dc.subjectinvariantes.es-ES
dc.titleMorse decomposition, attractors and chain recurrencees-ES
dc.typeinfo:eu-repo/semantics/article
dc.typeinfo:eu-repo/semantics/publishedVersion
dc.typePeer-reviewed Articleen-US


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