ℤ2–Thurston norm and complexity of
3–manifolds, II

Jaco, William; Rubinstein, J. Hyam; Spreer, Jonathan; Tillmann, Stephan

doi:10.2140/agt.2020.20.503

Cited by 9 publications

(13 citation statements)

References 19 publications

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“…Minimal triangulations, that is, topological ideal triangulations using the least number of ideal 3-simplices, are used in census enumeration, and as a platform to study the topology of the manifold using normal surface theory. In this paper, we establish basic facts about minimal ideal triangulations of cusped hyperbolic 3-manifolds in analogy with our previous work for closed 3-manifolds [20][21][22]. Throughout this paper, by a cusped hyperbolic 3-manifold, we mean an orientable noncompact 3-manifold M that admits a complete hyperbolic structure of finite volume.…”

Section: Introductionmentioning

confidence: 87%

“…The essence of the proof is a counting argument taking into account even edges, compression discs for the canonical normal representatives and types of tetrahedra. This is modelled on the blueprint for closed 3-manifolds [20][21][22]28]. Moreover, in the case of equality the triangulation is minimal, each canonical normal representative of a non-zero element in H H 2 (M, Z 2 ) is taut and meets each tetrahedron in a quadrilateral disc, and the number of tetrahedra in the triangulation is even.…”

Section: Quadrilateral Surfaces and Minimal Ideal Triangulationsmentioning

confidence: 99%

“…The argument for closed 3‐manifolds in hinged on an understanding of the intersections of maximal layered solid tori. We now carry such an analysis out in the case of cusped hyperbolic 3‐manifolds.…”

Section: The Anatomy Of a Minimal Ideal Triangulationmentioning

confidence: 99%

“…In § , we describe normal surfaces representing

Z_{2}

‐homology classes in ideal triangulations. We use this in § to prove our main result Theorem , which is analogous to the main result of . Before we can state it, we need to introduce some extra definitions.…”

Section: Introductionmentioning

confidence: 98%

“…We wish to emphasise that we do not work with

H_{2} false(\bar{M}, \partial \bar{M}; Z_{2} false)

. An analogue of Thurston's norm is defined in as follows. If

S

is connected, let

χ_{-} false(S false) = \max false{0, - χ (S) false}

, and otherwise let

χ_{-} false(S false) = \sum_{S_{i} \subset S} \max false{0, - χ (S_{i}) false},

where the sum is taken over all connected components of

S

.…”

Section: Introductionmentioning

confidence: 99%

See 4 more Smart Citations

On minimal ideal triangulations of cusped hyperbolic 3‐manifolds

Jaco

Rubinstein

Spreer

et al. 2019

Journal of Topology

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Previous work of the authors studies minimal triangulations of closed 3‐manifolds using a characterisation of low degree edges, embedded layered solid torus subcomplexes and 1‐dimensional Z2‐cohomology. The underlying blueprint is now used in the study of minimal ideal triangulations. As an application, it is shown that the monodromy ideal triangulations of the hyperbolic once‐punctured torus bundles are minimal.

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Section: Introductionmentioning

confidence: 87%

Section: Quadrilateral Surfaces and Minimal Ideal Triangulationsmentioning

confidence: 99%

Section: The Anatomy Of a Minimal Ideal Triangulationmentioning

confidence: 99%

“…In § , we describe normal surfaces representing