On an integral version of the Rasmussen invariant
Abstract
We define a Rasmussen s-invariant over the coefficient ring of the integers, and show how it is related to the s-invariants defined over a field. A lower bound for the slice genus of a knot arising from it is obtained, and we give examples of knots for which this lower bound is better than all lower bounds coming from the s-invariants over fields. We also compare it to the Lipshitz-Sarkar refinement related to the first Steenrod square.
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