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The symplectic arc algebra is formal

dc.creatorAbouzaid, Mohammed
dc.creatorSmith, Ivan
dc.date.accessioned2015-07-07
dc.date.accessioned2018-11-24T23:26:46Z
dc.date.available2016-06-07T09:30:02Z
dc.date.available2018-11-24T23:26:46Z
dc.date.issued2016-01-28
dc.identifierhttps://www.repository.cam.ac.uk/handle/1810/256187
dc.identifier.urihttp://repository.aust.edu.ng/xmlui/handle/123456789/3882
dc.description.abstractWe prove a formality theorem for the Fukaya categories of the symplectic manifolds underlying symplectic Khovanov cohomology over fields of characteristic zero. The key ingredient is the construction of a degree-one Hochschild cohomology class on a Floer A$_\infty$-algebra associated to the ($k$,$k$)-nilpotent slice $y_k$ obtained by counting holomorphic discs which satisfy a suitable conormal condition at infinity in a partial compactification $\bar y$$_k$. The space $\bar y$$_k$ is obtained as the Hilbert scheme of a partial compactification of the A$_{2k-1}$-Milnor fiber. A sequel to this paper will prove formality of the symplectic cup and cap bimodules and infer that symplectic Khovanov cohomology and Khovanov cohomology have the same total rank over characteristic zero fields.
dc.languageen
dc.publisherDuke University Press
dc.publisherDuke Mathematical Journal
dc.subjectsymplectic topology
dc.subjectKhovanov homology
dc.subjectFukaya category
dc.subjectnilpotent slice
dc.titleThe symplectic arc algebra is formal
dc.typeArticle


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