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dc.contributor.authorLopes, Artur Oscarpt_BR
dc.contributor.authorWhiters, W. Douglaspt_BR
dc.date.accessioned2018-07-03T02:26:08Zpt_BR
dc.date.issued1993pt_BR
dc.identifier.issn0933-7741pt_BR
dc.identifier.urihttp://hdl.handle.net/10183/180031pt_BR
dc.description.abstractIn this paper we consider Thermodynamic Formalism propcrties o fone dimensional maps. Wc consider the existence ofweight-balanced measures and large dcviation propcrtics o f the Frcc-Encrgy of the Jacobian of measures. We show that a wcight-balanced mcasure exists under the hypotheses that the map is piccewisc-homeomorphic and the weights picccwisc constant. We considcr also a certain class of measures with the property that thc Frce-Encrgy of the Jacobian is difTerentiable by parts. For measures in this class wc show that a certa in measure is the maximal entropy measurc i f and only ifthe Frcc-Energy of thc Jacobian i~ linear. Tite rcsult follows from general propcrtics of Large-Deviation Thcory and does not use the more classical approach of Thcrmodynamic Formalism.en
dc.format.mimetypeapplication/pdfpt_BR
dc.language.isoengpt_BR
dc.relation.ispartofForum mathematicum. Berlin. v. 5, (1993), p. 161-182.pt_BR
dc.rightsOpen Accessen
dc.subjectMedidas de peso : Energia livre : Sistemasdinamicospt_BR
dc.subjectDinamica uni-dimensionalpt_BR
dc.titleWeight-balanced measures and free energy for one-dimensional dynamicspt_BR
dc.typeArtigo de periódicopt_BR
dc.identifier.nrb000108722pt_BR
dc.type.originEstrangeiropt_BR


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