Abstract
Agol recently introduced the concept of a veering taut triangulation of a 3-manifold, which is a taut ideal triangulation with some extra combinatorial structure. We define the weaker notion of a "veering triangulation" and use it to show that all veering triangulations admit strict angle structures. We also answer a question of Agol, giving an example of a veering taut triangulation that is not layered.
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APA
Hodgson, C. D., Hyam Rubinstein, J., Segerman, H., & Tillmann, S. (2011). Veering triangulations admit strict angle structures. Geometry and Topology, 15(4), 2073–2089. https://doi.org/10.2140/gt.2011.15.2073
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