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Bounding the Kirby-Thompson invariant of spun knots

Published 4 Dec 2021 in math.GT | (2112.02420v1)

Abstract: A bridge trisection of a smooth surface in $S4$ is a decomposition analogous to a bridge splitting of a link in $S3$. The Kirby-Thompson invariant of a bridge trisection measures its complexity in terms of distances between disc sets in the pants complex of the trisection surface. We give the first significant bounds for the Kirby-Thompson invariant of spun knots. In particular, we show that the Kirby-Thompson invariant of the spun trefoil is 15.

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