A module structure on odd Khovanov homology and the odd invariant for ribbon 2-knots
Abstract
We prove that the reduced odd Khovanov homology of a link L is naturally a module over the exterior algebra of the first homology of the link's branched double-cover. We then describe this module structure more geometrically and related it to the odd Khovanov maps induced by link cobordisms. As an application, we will give a combinatorial proof of a recent result of Spyropoulos-Vidyarthi-Zhang about the odd invariant for 2-knots in the special case where the 2-knot is a ribbon 2-knot. Additionally, we will show that Levine-Zemke's main result from their 2019 paper on Khovanov homology and ribbon concordance remains true for odd Khovanov homology with rational coefficients and with coefficients in Z2k.
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