Geometric triangulations of a family of hyperbolic 3-braids
Abstract
We construct topological triangulations for complements of (-2,3,n)-pretzel knots and links with n7. Following a procedure outlined by Futer and Gu\'eritaud, we use a theorem of Casson and Rivin to prove the constructed triangulations are geometric. Futer, Kalfagianni, and Purcell have shown (indirectly) that such braids are hyperbolic. The new result here is a direct proof.
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