Geodesic length spectrum on compact Riemann surfaces

dc.contributor.authorGrácio, Clara
dc.contributor.authorRamos, José Sousa
dc.date.accessioned2012-12-10T12:39:33Z
dc.date.available2012-12-10T12:39:33Z
dc.date.issued2010
dc.description.abstractIn this paper we use techniques linking combinatorial structures (symbolic dynamics) and algebraic-geometric structures to study the variation of the geodesic length spectrum, with the Fenchel-Nielsen coordinates, which parametrize the surface of genus τ = 2. We explicitly compute length spectra, for all closed orientable hyperbolic genus two surfaces, identifying the exponential growth rate and the first terms of growth series.por
dc.identifier.authoremailmgracio
dc.identifier.authoremailnd
dc.identifier.citationClara Grácio e J. Sousa Ramos , “Geodesic length spectrum on compact Riemann surfaces”, Journal of Geometry and Physics, 60, pgs 1643-1655, 2010.por
dc.identifier.scientificarea721por
dc.identifier.urihttp://hdl.handle.net/10174/6775
dc.language.isoengpor
dc.peerreviewedyespor
dc.publisherJournal of Geometry and Physicspor
dc.rightsopenAccesspor
dc.subjectgeodesicpor
dc.titleGeodesic length spectrum on compact Riemann surfacespor
dc.typearticlepor

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