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Main Authors: Baker, Kenneth L., Moore, Allison H., O'Donnol, Danielle, Taylor, Scott
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2405.15044
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author Baker, Kenneth L.
Moore, Allison H.
O'Donnol, Danielle
Taylor, Scott
author_facet Baker, Kenneth L.
Moore, Allison H.
O'Donnol, Danielle
Taylor, Scott
contents A totally oriented Klein graph is a trivalent spatial graph in the 3-sphere with a 3-coloring of its edges and an orientation on each bicolored link. A totally oriented Klein foam is a 3-colored 2-complex in the 4-ball whose boundary is a Klein foam and whose bicolored surfaces are oriented. We extend Gille-Robert's signature for 3-Hamiltonian Klein graphs to all totally oriented Klein graphs and develop an analogy of Murasugi's bounds relating the signature, slice genus and unknotting number of knots. In particular, we show that the signature of a totally oriented Klein graph produces a lower bound on the negative orbifold Euler characteristic of certain totally oriented Klein foams bounded by $Γ$. When $Γ$ is abstractly planar, these negative Euler characteristics, in turn, produce a lower bound on a certain natural unknotting number for $Γ$. Mutatis mutandi, we produce lower bounds on the corresponding Gordian distance between two totally oriented Klein graphs that can be related by a sequence of crossing changes. We also give examples of theta-curves for which our lower bounds on unknotting number improve on previously known bounds.
format Preprint
id arxiv_https___arxiv_org_abs_2405_15044
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Signature, slicing foams, and crossing changes of Klein graphs
Baker, Kenneth L.
Moore, Allison H.
O'Donnol, Danielle
Taylor, Scott
Geometric Topology
57K10, 57K12
A totally oriented Klein graph is a trivalent spatial graph in the 3-sphere with a 3-coloring of its edges and an orientation on each bicolored link. A totally oriented Klein foam is a 3-colored 2-complex in the 4-ball whose boundary is a Klein foam and whose bicolored surfaces are oriented. We extend Gille-Robert's signature for 3-Hamiltonian Klein graphs to all totally oriented Klein graphs and develop an analogy of Murasugi's bounds relating the signature, slice genus and unknotting number of knots. In particular, we show that the signature of a totally oriented Klein graph produces a lower bound on the negative orbifold Euler characteristic of certain totally oriented Klein foams bounded by $Γ$. When $Γ$ is abstractly planar, these negative Euler characteristics, in turn, produce a lower bound on a certain natural unknotting number for $Γ$. Mutatis mutandi, we produce lower bounds on the corresponding Gordian distance between two totally oriented Klein graphs that can be related by a sequence of crossing changes. We also give examples of theta-curves for which our lower bounds on unknotting number improve on previously known bounds.
title Signature, slicing foams, and crossing changes of Klein graphs
topic Geometric Topology
57K10, 57K12
url https://arxiv.org/abs/2405.15044