Systolic inequalities for the number of vertices

Sergey Avvakumov; Alexey Balitskiy; Alfredo Hubard; Roman Karasev

doi:10.1142/S179352532350005X

Systolic inequalities for the number of vertices

Sergey Avvakumov, Alexey Balitskiy, Alfredo Hubard, Roman Karasev

Research output: Contribution to journal › Article › peer-review

Abstract

Inspired by the classical Riemannian systolic inequality of Gromov, we present a combinatorial analogue providing a lower bound on the number of vertices of a simplicial complex in terms of its edge-path systole. Similarly to the Riemannian case, where the inequality holds under a topological assumption of "essentiality", our proofs rely on a combinatorial analogue of that assumption. Under a stronger assumption, expressed in terms of cohomology cup-length, we improve our results quantitatively. We also illustrate our methods in the continuous setting, generalizing and improving quantitatively the Minkowski principle of Balacheff and Karam; a corollary of this result is the extension of the Guth-Nakamura cup-length systolic bound from manifolds to complexes.

Original language	English
Pages (from-to)	955-977
Number of pages	23
Journal	Journal of Topology and Analysis
Volume	16
Issue number	6
DOIs	https://doi.org/10.1142/S179352532350005X
State	Published - 1 Dec 2024
Externally published	Yes

Funding

Funders	Funder number
Center for Advanced Systems and Engineering, Syracuse University
Alexander Kamal
ANR-17-CE40-0033
European Union's Seventh Framework Programme ERC
European Commission
European Research Council
National Science Foundation	DMS-1926686
Agence Nationale de la Recherche	ANR-17-CE40-0033
Saudi Ophthalmological Society	ANR-19-CE40-0014, ANR-17-CE40-0018, ERC-339025
Horizon 2020 Framework Programme	339025, 716424

Keywords

Systolic inequality
triangulation

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10.1142/S179352532350005X

Cite this

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AU - Avvakumov, Sergey

AU - Balitskiy, Alexey

AU - Hubard, Alfredo

AU - Karasev, Roman

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Y1 - 2024/12/1

N2 - Inspired by the classical Riemannian systolic inequality of Gromov, we present a combinatorial analogue providing a lower bound on the number of vertices of a simplicial complex in terms of its edge-path systole. Similarly to the Riemannian case, where the inequality holds under a topological assumption of "essentiality", our proofs rely on a combinatorial analogue of that assumption. Under a stronger assumption, expressed in terms of cohomology cup-length, we improve our results quantitatively. We also illustrate our methods in the continuous setting, generalizing and improving quantitatively the Minkowski principle of Balacheff and Karam; a corollary of this result is the extension of the Guth-Nakamura cup-length systolic bound from manifolds to complexes.

AB - Inspired by the classical Riemannian systolic inequality of Gromov, we present a combinatorial analogue providing a lower bound on the number of vertices of a simplicial complex in terms of its edge-path systole. Similarly to the Riemannian case, where the inequality holds under a topological assumption of "essentiality", our proofs rely on a combinatorial analogue of that assumption. Under a stronger assumption, expressed in terms of cohomology cup-length, we improve our results quantitatively. We also illustrate our methods in the continuous setting, generalizing and improving quantitatively the Minkowski principle of Balacheff and Karam; a corollary of this result is the extension of the Guth-Nakamura cup-length systolic bound from manifolds to complexes.

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Systolic inequalities for the number of vertices

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