Traversing three-manifold triangulations and spines
J. Hyam Rubinstein
University of Melbourne, Parkville, AustraliaHenry Segerman
Oklahoma State University, Stillwater, USAStephan Tillmann
The University of Sydney, Australia
Abstract
A celebrated result concerning triangulations of a given closed three-manifold is that any two triangulations with the same number of vertices are connected by a sequence of so-called 2–3 and 3–2 moves. A similar result is known for ideal triangulations of topologically finite non-compact three-manifolds. These results build on classical work that goes back to Alexander, Newman, Moise, and Pachner. The key special case of one-vertex triangulations of closed three-manifolds was independently proven by Matveev and Piergallini. The general result for closed three-manifolds can be found in work of Benedetti and Petronio, and Amendola gives a proof for topologically finite non-compact three-manifolds. These results (and their proofs) are phrased in the dual language of spines.
The purpose of this note is threefold. We wish to popularise Amendola’s result; we give a combined proof for both closed and non-compact manifolds that emphasises the dual viewpoints of triangulations and spines; and we give a proof replacing a key general position argument due to Matveev with a more combinatorial argument inspired by the theory of subdivisions.
Cite this article
J. Hyam Rubinstein, Henry Segerman, Stephan Tillmann, Traversing three-manifold triangulations and spines. Enseign. Math. 65 (2019), no. 1/2, pp. 155–206
DOI 10.4171/LEM/65-1/2-5