Odd annular Bar-Natan category and gl(1|1)

Abstract

We introduce two monoidal supercategories: the odd dotted Temperley-Lieb category T\!Lo,(δ), which is a generalization of the odd Temperley-Lieb category studied by Brundan and Ellis, and the odd annular Bar-Natan category BN\!o(A), which generalizes the odd Bar-Natan category studied by Putyra. We then show there is an equivalence of categories between them if δ=0. We use this equivalence to better understand the action of the Lie superalgebra gl(1|1) on the odd Khovanov homology of a knot in a thickened annulus found by Grigsby and the second author.