Link mutations and Goeritz matrices

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October 2022 Link mutations and Goeritz matrices

Lorenzo Traldi

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Lorenzo Traldi¹
¹Lafayette College

Osaka J. Math. 59(4): 881-904 (October 2022).

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Abstract

Extending theorems of J. E. Greene [Invent. Math. \textbf{192} (2013), 717-750] and A. S. Lipson [Enseign. Math. (2) \textbf{36} (1990), 93-114], we prove that the equivalence class of a classical link $L$ under mutation is determined by Goeritz matrices associated to diagrams of $L$.

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Lorenzo Traldi. "Link mutations and Goeritz matrices." Osaka J. Math. 59 (4) 881 - 904, October 2022.

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Received: 7 January 2021; Revised: 16 August 2021; Published: October 2022

First available in Project Euclid: 4 October 2022

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Rights: Copyright © 2022 Osaka University and Osaka Metropolitan University, Departments of Mathematics

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Osaka J. Math.

Vol.59 • No. 4 • October 2022

Osaka University and Osaka Metropolitan University, Departments of Mathematics

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Lorenzo Traldi "Link mutations and Goeritz matrices," Osaka Journal of Mathematics, Osaka J. Math. 59(4), 881-904, (October 2022)

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