Stability of tori under lower sectional curvature

Elia Brué; Aaron Naber; Daniele Semola

doi:10.2140/gt.2024.28.3961

Stability of tori under lower sectional curvature

Elia Brué, Aaron Naber, Daniele Semola

Publications: Contribution to journal › Article › Peer Reviewed

Abstract

Let (Mi ^{n; g}i) ^GH→ (X; d _X) be a Gromov–Hausdorff converging sequence of Riemannian manifolds with Sec _gi > 1, diam(M _i) < D, and such that the Mi ⁿ are all homeomorphic to tori T ⁿ . Then X is homeomorphic to a k–dimensional torus T ^k for some 0 < k < n. This answers a question of Petrunin in the affirmative. We show this result is false if the Mi ⁿ are homeomorphic to tori, but are only assumed to be Alexandrov spaces. When n = 3, we prove the same toric stability under the weaker condition Ric _gi > 2.

Original language	English
Pages (from-to)	3961–3972
Number of pages	12
Journal	Geometry & Topology
Volume	28
Issue number	8
DOIs	https://doi.org/10.2140/gt.2024.28.3961
Publication status	Published - 20 Dec 2024
Externally published	Yes

Austrian Fields of Science 2012

101009 Geometry

Keywords

Sectional
Curvature
Stability
tori
sectional
stability
curvature

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10.2140/gt.2024.28.3961

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T1 - Stability of tori under lower sectional curvature

AU - Brué, Elia

AU - Naber, Aaron

AU - Semola, Daniele

PY - 2024/12/20

Y1 - 2024/12/20

N2 - Let (Mi n; gi) GH→ (X; d X) be a Gromov–Hausdorff converging sequence of Riemannian manifolds with Sec gi > 1, diam(M i) < D, and such that the Mi n are all homeomorphic to tori T n . Then X is homeomorphic to a k–dimensional torus T k for some 0 < k < n. This answers a question of Petrunin in the affirmative. We show this result is false if the Mi n are homeomorphic to tori, but are only assumed to be Alexandrov spaces. When n = 3, we prove the same toric stability under the weaker condition Ric gi > 2.

AB - Let (Mi n; gi) GH→ (X; d X) be a Gromov–Hausdorff converging sequence of Riemannian manifolds with Sec gi > 1, diam(M i) < D, and such that the Mi n are all homeomorphic to tori T n . Then X is homeomorphic to a k–dimensional torus T k for some 0 < k < n. This answers a question of Petrunin in the affirmative. We show this result is false if the Mi n are homeomorphic to tori, but are only assumed to be Alexandrov spaces. When n = 3, we prove the same toric stability under the weaker condition Ric gi > 2.

KW - Sectional

KW - Curvature

KW - Stability

KW - tori

KW - sectional

KW - stability

KW - curvature

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DO - 10.2140/gt.2024.28.3961

M3 - Article

SN - 1465-3060

VL - 28

SP - 3961

EP - 3972

JO - Geometry & Topology

JF - Geometry & Topology

IS - 8

ER -

Stability of tori under lower sectional curvature

Abstract

Austrian Fields of Science 2012

Keywords

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