Permanent link to this recordhttp://hdl.handle.net/20.500.12613/5968
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AbstractAgol recently introduced the notion of a veering triangulation, and showed that such triangulations naturally arise as layered triangulations of fibered hyperbolic 3-manifolds. We prove, by a constructive argument, that every veering triangulation admits positive angle structures, recovering a result of Hodgson, Rubinstein, Segerman, and Tillmann. Our construction leads to explicit lower bounds on the smallest angle in this positive angle structure, and to information about angled holonomy of the boundary tori.
Citation to related workMathematical Sciences Publishers
Has partAlgebraic and Geometric Topology
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