An L∞-module Structure on Annular Khovanov Homology

Abstract

Let L be a link in a thickened annulus. Grigsby-Licata-Wehrli showed that the annular Khovanov homology of L is equipped with an action of sl2(), the exterior current algebra of the Lie algebra sl2. In this paper, we upgrade this result to the setting of L∞-algebras and modules. That is, we show that sl2() is an L∞-algebra and that the annular Khovanov homology of L is an L∞-module over sl2(). Up to L∞-quasi-isomorphism, this structure is invariant under Reidemeister moves. Finally, we include explicit formulas to compute the higher L∞-operations.