Equivariant Unknotting Number and Involutive Khovanov Homology
Abstract
We demonstrate that the equivariant unknotting number u(K) of a strongly invertible knot K is bounded below by the H-torsion order ord(K) of the involutive Bar-Natan homology BN(K). This result serves as an equivariant analogue to the bound established by Alishahi. As an application, we identify five strongly invertible prime knots with crossing numbers at most 9 for which the strict inequality u(K) < u(K) holds.
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