Symplectic annular Khovanov homology and fixed point localizations

Abstract

We introduce a new version of symplectic annular Khovanov homology and establish spectral sequences from (i) the symplectic annular Khovanov homology of a knot to the link Floer homology of the lift of the annular axis in the double branched cover; (ii) the symplectic Khovanov homology of a two-periodic knot to the symplectic annular Khovanov homology of its quotient; and (iii) the symplectic Khovanov homology of a strongly invertible knot to the cone of the axis-moving map between the symplectic annular Khovanov homology of the two resolutions of its quotient.

Metadata

Item Type:	Article
Authors/Creators:	Hendricks, K. Mak, C.Y. https://orcid.org/0000-0001-6334-7114 Raghunath, S.
Copyright, Publisher and Additional Information:	© 2026 American Mathematical Society
Dates:	Accepted: 18 January 2026
Institution:	The University of Sheffield
Academic Units:	The University of Sheffield > Faculty of Science (Sheffield) > School of Mathematical and Physical Sciences
Funding Information:	Funder Grant number ROYAL SOCIETY URF\R1\221047 / RF\ERE\221094 ROYAL SOCIETY UNSPECIFIED Royal Society URF\R1\221047
Date Deposited:	09 Feb 2026 11:40
Last Modified:	09 Feb 2026 11:40
Status:	In Press
Publisher:	American Mathematical Society
Refereed:	Yes
Open Archives Initiative ID (OAI ID):	oai:eprints.whiterose.ac.uk:236685

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Symplectic annular Khovanov homology and fixed point localizations

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