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Presymplectic characterization of Liouville sectors with corners, and its monoidality

Part of: Symplectic geometry, contact geometry

Published online by Cambridge University Press:  12 September 2025

Yong-Geun Oh Open the ORCID record for Yong-Geun Oh [Opens in a new window]
Yong-Geun Oh*
Affiliation:
Center for Geometry and Physics, Institute for Basic Science (POSTECH Campus), Pohang-si, Gyeongsangbuk-do, Korea POSTECH, Gyeongsangbuk-do, Korea
*
Email: yongoh1@postech.ac.kr
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Abstract

We provide a presymplectic characterization of Liouville sectors introduced by Ganatra–Pardon–Shende in [10, 12] in terms of the characteristic foliation of the boundary, which we call Liouville σ-sectors. We extend this definition to the case with corners using the presymplectic geometry of null foliations of the coisotropic intersections of transverse coisotropic collection of hypersurfaces, which appear in the definition of Liouville sectors with corners. We show that the set of Liouville σ-sectors with corners canonically forms a monoid that provides a natural framework for considering the Künneth-type functors in the wrapped Fukaya category. We identify its automorphism group that enables one to give a natural definition of bundles of Liouville sectors. As a byproduct, we affirmatively answer a question raised in [10, Question 2.6], which asks about the optimality of their definition of Liouville sectors in [10].

Keywords

Liouville sectorsLiouville σ-sectorspresymplectic geometryGotay’s coisotropic embeddging theoremtransverse coisotropic collection

MSC classification

Primary: 53D40: Floer homology and cohomology, symplectic aspects
Secondary: 53D05: Symplectic manifolds, general

Information

Type
Research Article
Information
Proceedings of the Edinburgh Mathematical Society , First View , pp. 1 - 71
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Copyright
© The Author(s), 2025. Published by Cambridge University Press on behalf of The Edinburgh Mathematical Society.

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