Kouki Sato, Kokoro Tanaka
Published 2020-04-15Version 1
Meier and Zupan introduced bridge trisections of surface links in $S^4$ as a 4-dimensional analogue to bridge decompositions of classical links, which gives a numerical invariant of surface links called the bridge number. We prove that there exist infinitely many surface knots with bridge number $n$ for any integer $n \geq 4$. To prove it, we use colorings of surface links by keis and give lower bounds for the bridge number of surface links.
Comments: 11 pages, 2 figures
Boundary-reducing surgeries and bridge number
The Jones-Krushkal polynomial and minimal diagrams of surface links
Bridge trisections in $\mathbb{CP}^2$ and the Thom conjecture
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