2011
DOI: 10.5186/aasfm.2011.3637
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On Fenchel-Nielsen coordinates on Teichmüller spaces of surfaces of infinite type

Abstract: Abstract. We introduce Fenchel-Nielsen coordinates on Teichmüller spaces of surfaces of infinite type. The definition is relative to a given pair of pants decomposition of the surface. We start by establishing conditions under which any pair of pants decomposition on a hyperbolic surface of infinite type can be turned into a geometric decomposition, that is, a decomposition into hyperbolic pairs of pants. This is expressed in terms of a condition we introduce and which we call Nielsen-convexity. This condition… Show more

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Cited by 36 publications
(92 citation statements)
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“…To be precise, we require that our surfaces have a certain type of bounded geometry, namely that they admit a (generalized) pants decomposition where supremum of the lengths of the individual curves in the decomposition is bounded. Deformation spaces of such surfaces have been studied by Alessandrini et al [1,2] and have been called upper-bounded surfaces.…”
Section: Introductionmentioning
confidence: 99%
“…To be precise, we require that our surfaces have a certain type of bounded geometry, namely that they admit a (generalized) pants decomposition where supremum of the lengths of the individual curves in the decomposition is bounded. Deformation spaces of such surfaces have been studied by Alessandrini et al [1,2] and have been called upper-bounded surfaces.…”
Section: Introductionmentioning
confidence: 99%
“…Furthermore, we can glue all the new pairs of pants together (in the same topological pattern as before) with appropriate twists such that the resulting structure is f (X j L ). The gluing map is again a quasiconformal mapping, with dilatation controlled by (an upper bound of) the lengths and twists of the curves in the pants decomposition (see [3]). …”
Section: The Lemma Follows From This Results and (5)mentioning
confidence: 99%
“…Otherwise it is said to be of infinite type. For more details on Teichmüller spaces of surfaces of infinite type (where the definition of Teichmüller space is not unique and more involved), we refer to [3].…”
Section: Metrics On Teichmüller Spaces Of Surfaces Of Infinite Typementioning
confidence: 99%