From hypertoric geometry to bordered Floer homology via the m=1 amplituhedron

Aaron D. Lauda*, Anthony M. Licata, Andrew Manion

*Corresponding author for this work

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    1 Citation (Scopus)

    Abstract

    We relate the Fukaya category of the symmetric power of a genus zero surface to deformed category O of a cyclic hypertoric variety by establishing an isomorphism between algebras defined by Ozsváth–Szabó in Heegaard–Floer theory and Braden–Licata–Proudfoot–Webster in hypertoric geometry. The proof extends work of Karp–Williams on sign variation and the combinatorics of the m=1 amplituhedron. We then use the algebras associated to cyclic arrangements to construct categorical actions of gl(1|1), and generalize our isomorphism to give a conjectural algebraic description of the Fukaya category of a complexified hyperplane complement.

    Original languageEnglish
    Article number43
    JournalSelecta Mathematica, New Series
    Volume30
    Issue number3
    DOIs
    Publication statusPublished - Jul 2024

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