Please use this identifier to cite or link to this item: https://scholarbank.nus.edu.sg/handle/10635/102986
DC FieldValue
dc.titleCircle packings on surfaces with protective structures
dc.contributor.authorKojima, S.
dc.contributor.authorMizushima, S.
dc.contributor.authorTan, S.P.
dc.date.accessioned2014-10-28T02:32:03Z
dc.date.available2014-10-28T02:32:03Z
dc.date.issued2003-03
dc.identifier.citationKojima, S.,Mizushima, S.,Tan, S.P. (2003-03). Circle packings on surfaces with protective structures. Journal of Differential Geometry 63 (3) : 349-397. ScholarBank@NUS Repository.
dc.identifier.issn0022040X
dc.identifier.urihttp://scholarbank.nus.edu.sg/handle/10635/102986
dc.description.abstractThe Koebe-Andreev-Thurston theorem states that for any triangulation of a closed orientable surface ∑g of genus g which is covered by a simple graph in the universal cover, there exists a unique metric of curvature 1,0 or -1 on the surface depending on whether g = 0,1 or ≥ 2 such that the surface with this metric admits a circle packing with combinatorics given by the triangulation. Furthermore, the circle packing is essentially rigid, that is, unique up to conformal automorphisms of the surface isotopic to the identity. In this paper, we consider projective structures on the surface where circle packings are also defined. We show that the space of projective structures on a surface of genus g ≥ 2 which admits a circle packing contains a neigborhood of the Koebe-Andreev-Thurston structure homeomorphic to Rℝ6g-6 furthemore show that if a circle packing consists of one circle, then the space is globally homeomorphic to Rℝ6g-6 and that the circle packing is rigid.
dc.sourceScopus
dc.typeArticle
dc.contributor.departmentMATHEMATICS
dc.description.sourcetitleJournal of Differential Geometry
dc.description.volume63
dc.description.issue3
dc.description.page349-397
dc.identifier.isiutNOT_IN_WOS
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