An odd Khovanov homotopy type
Abstract
For each link L in S3 and every quantum grading j, we construct a stable homotopy type Xjo(L) whose cohomology recovers Ozsvath-Rasmussen-Szabo's odd Khovanov homology, Hi(Xjo(L)) = Khi,jo(L), following a construction of Lawson-Lipshitz-Sarkar of the even Khovanov stable homotopy type. Furthermore, the odd Khovanov homotopy type carries a Z/2 action whose fixed point set is a desuspension of the even Khovanov homotopy type. We also construct a Z/2 action on an even Khovanov homotopy type, with fixed point set a desuspension of Xjo(L).
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