Symplectic topology and ideal-valued measures

Adi Dickstein; Yaniv Ganor; Leonid Polterovich; Frol Zapolsky

doi:10.1007/s00029-024-00967-x

Symplectic topology and ideal-valued measures

Adi Dickstein, Yaniv Ganor, Leonid Polterovich, Frol Zapolsky

Department of Mathematics

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

Abstract

We adapt Gromov’s notion of ideal-valued measures to symplectic topology, and use it for proving new results on symplectic rigidity and symplectic intersections. Furthermore, it allows us to discuss three “big fiber theorems”—the Centerpoint Theorem in combinatorial geometry, the Maximal Fiber Inequality in topology, and the Non-displaceable Fiber Theorem in symplectic topology—from a unified viewpoint. Our main technical tool is an enhancement of the symplectic cohomology theory recently developed by Varolgüneş.

Original language	English
Article number	88
Journal	Selecta Mathematica, New Series
Volume	30
Issue number	5
DOIs	https://doi.org/10.1007/s00029-024-00967-x
State	Published - Nov 2024

Bibliographical note

Publisher Copyright:
© The Author(s) 2024.

Keywords

53DXX
55UXX

ASJC Scopus subject areas

General Mathematics
General Physics and Astronomy

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10.1007/s00029-024-00967-x

Cite this

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abstract = "We adapt Gromov{\textquoteright}s notion of ideal-valued measures to symplectic topology, and use it for proving new results on symplectic rigidity and symplectic intersections. Furthermore, it allows us to discuss three “big fiber theorems”—the Centerpoint Theorem in combinatorial geometry, the Maximal Fiber Inequality in topology, and the Non-displaceable Fiber Theorem in symplectic topology—from a unified viewpoint. Our main technical tool is an enhancement of the symplectic cohomology theory recently developed by Varolg{\"u}ne{\c s}.",

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AU - Zapolsky, Frol

PY - 2024/11

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N2 - We adapt Gromov’s notion of ideal-valued measures to symplectic topology, and use it for proving new results on symplectic rigidity and symplectic intersections. Furthermore, it allows us to discuss three “big fiber theorems”—the Centerpoint Theorem in combinatorial geometry, the Maximal Fiber Inequality in topology, and the Non-displaceable Fiber Theorem in symplectic topology—from a unified viewpoint. Our main technical tool is an enhancement of the symplectic cohomology theory recently developed by Varolgüneş.

AB - We adapt Gromov’s notion of ideal-valued measures to symplectic topology, and use it for proving new results on symplectic rigidity and symplectic intersections. Furthermore, it allows us to discuss three “big fiber theorems”—the Centerpoint Theorem in combinatorial geometry, the Maximal Fiber Inequality in topology, and the Non-displaceable Fiber Theorem in symplectic topology—from a unified viewpoint. Our main technical tool is an enhancement of the symplectic cohomology theory recently developed by Varolgüneş.

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KW - 55UXX

UR - https://www.scopus.com/pages/publications/85206384476

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AN - SCOPUS:85206384476

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JO - Selecta Mathematica, New Series

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ER -

Symplectic topology and ideal-valued measures

Abstract

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Keywords

ASJC Scopus subject areas

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