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dc.creatorGaeta, Giuseppe
dc.date2007-12-01
dc.date.accessioned2019-05-03T12:36:46Z
dc.date.available2019-05-03T12:36:46Z
dc.identifierhttp://revistas.ufro.cl/ojs/index.php/cubo/article/view/1583
dc.identifier.urihttp://revistaschilenas.uchile.cl/handle/2250/84311
dc.descriptionThe Poincaré-Dulac normalization procedure is based on a sequence of coordinate transformations generated by solutions to homologlcal equations; in the presence of resonances, such solutions are not unique and one has to make some-what arbitrary choices for elements in the kernel of relevant homological operators, different choices producing different higher order effects. The simplest, and usual, choice is to set these kernel elements to zero; here we discuss how a different prescription can lead to a further simplification of the resulting normal form, in a completely algorithmic way.en-US
dc.formatapplication/pdf
dc.languageeng
dc.publisherUniversidad de La Frontera. Temuco, Chile.en-US
dc.relationhttp://revistas.ufro.cl/ojs/index.php/cubo/article/view/1583/1436
dc.sourceCUBO, A Mathematical Journal; Vol. 9 Núm. 3 (2007): CUBO, A Mathematical Journal; 1–11es-ES
dc.sourceCUBO, A Mathematical Journal; Vol 9 No 3 (2007): CUBO, A Mathematical Journal; 1–11en-US
dc.source0719-0646
dc.source0716-7776
dc.titleFurther reduction of Poincaré-Dulac normal forms in symmetric systemsen-US
dc.typeinfo:eu-repo/semantics/article
dc.typeinfo:eu-repo/semantics/publishedVersion


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