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A
friendly introduction to the bordered contact invariant
Akram Alishahi, Joan E. Licata, Ina Petkova and Vera Vértesi |
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Vol. 5 (2022), No. 1, 1–30
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DOI: 10.2140/obs.2022.5.1
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Abstract |
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We give a short introduction to the contact invariant in bordered Floer homology defined by Földvári, Hendricks, and the authors. We survey the contact geometry required to understand the new invariant but assume some familiarity with bordered Heegaard Floer invariants. The input for the construction is a special class of foliated open books, which are introduced carefully and with multiple examples. We discuss how a foliated open book may be constructed from an open book for a closed manifold, and how it may be modified to ensure compatibility with the contact bordered invariant. As an application of these techniques, we give a “local proof” of the vanishing of the contact invariant for overtwisted structures in the form of an explicit bordered computation. |
Keywords
Heegaard Floer homology, open book, TQFT, contact topology
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Mathematical Subject Classification
Primary: 57K33, 57R58
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Milestones
Received: 1 March 2021
Revised: 22 December 2021
Accepted: 3 January 2022
Published: 27 October 2022
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Authors |
| Akram Alishahi | |
| Department of Mathematics University of Georgia Boyd Graduate Studies Research Center Athens, GA United States |
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| Joan E. Licata | |
| Australian National University Ainslie ACT Australia |
Mathematical Sciences Institute, The
Australian National University Canberra, Australia |
| Ina Petkova | |
| Department of Mathematics Dartmouth College Hanover, NH United States |
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| Vera Vértesi | |
| University of Vienna Vienna Austria |
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