Estimates of Covering Type and the Number of Vertices of Minimal Triangulations

Govc, Dejan; Marzantowicz, Wacław; Pavešić, Petar

doi:10.1007/s00454-019-00092-z

Cited by 7 publications

(15 citation statements)

References 9 publications

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“…Let us begin with a slight improvement of the theorem first proved by Brehm and Kühnel [3]. Our approach is based on the notion of covering type [8] and is much simpler than the original one. Recall that Poincaré duality together with the positive answer to the Poincaré conjecture imply that every simply-connected closed d-manifold, whose reduced homology is trivial in dimensions less or equal to d/2 is homeomorphic to the d-sphere.…”

Section: Introduction and Resultsmentioning

confidence: 99%

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Triangulations with few vertices of manifolds with non-free fundamental group

Pavešić¹

2019

Proceedings of the Royal Society of Edinburgh: Section A Mathem

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We study lower bounds for the number of vertices in a PL-triangulation of a given manifold M . While most of the previous estimates are based on the dimension and the connectivity of M , we show that further information can be extracted by studying the structure of the fundamental group of M and applying techniques from the Lusternik-Schnirelmann category theory. In particular, we prove that every PL-triangulation of a d-dimensional manifold (d ≥ 3) whose fundamental group is not free has at least 3d + 1 vertices. As a corollary, every d-dimensional (Zp-)homology sphere that admits a PL-triangulation with less than 3d vertices is homeomorphic to S d . Another important consequence is that every triangulation with small links of M is combinatorial.

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Section: Introduction and Resultsmentioning

confidence: 99%

“…Govc, Marzantowicz and Pavešić [7] applied techniques from Lusternik-Schnirelmann category to obtain further estimates of the covering type of a space and proved the following results: vertices.…”

Section: 3mentioning

confidence: 99%

Triangulations with few vertices of manifolds with non-free fundamental group

Pavešić¹

2019

Proceedings of the Royal Society of Edinburgh: Section A Mathem

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“…The covering type is obviously a homotopy invariant of the space and can thus be related to other homotopy invariants -cf. [19] and [14].…”

Section: Homotopy Triangulations and Category Weightmentioning

confidence: 99%

“…In [14] we introduced several new estimates for the minimal number of vertices that are needed to triangulate a compact triangulable space X based on the Lusternik-Schnirelmann category of X and on the structure of the cohomology ring of X. In the case of manifolds these estimates were improved by using information obtained from the fundamental group in [26] and on the Lower Bound Theorem in [15].…”

Section: Introductionmentioning

confidence: 99%

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Estimates of covering type and minimal triangulations based on category weight

Govc¹,

Marzantowicz²,

Pavešić³

2021

Preprint

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In a recent publication [14] we have introduced a new method, based on the Lusternik-Schnirelmann category and the cohomology ring of a space X, that yields lower bounds for the size of a triangulation of X. In this paper we present an important extension that takes into account the fundamental group of X. In fact, if π1(X) contains elements of finite order, then one can often find cohomology classes of high 'category weight', which in turn allow for much stronger estimates of the size of triangulations of X. We develop several weighted estimates and then apply our method to compute explicit lower bounds for the size of triangulations of orbit spaces of cyclic group actions on a variety of spaces including products of spheres, Stiefel manifolds, Lie groups and highly-connected manifolds.

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