A Steenrod square on Khovanov homology and a cup-i product
Abstract
Lipshitz-Sarkar defined a stable homotopy type refining Khovanov homology, producing cohomology operations Sqi on the Khovanov homology Kh(L) of a link L. Later, Mor\'an proposed a sequence of cup-i products on the F2-coefficient cochain complex of any augmented semi-simplicial object in the Burnside category. Applied to the Khovanov functor, he obtained another sequence of operations sqn on Kh(L), where sq0, sq1 agree with the usual Steenrod squares. We prove that Lipshitz-Sarkar's Sq2, the first Steenrod operation that cannot be computed from merely homological data, agrees with Mor\'an's sq2.
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