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Knots, Links, Spatial Graphs, and Algebraic Invariants
About this Title
Erica Flapan, Pomona College, Claremont, CA, Allison Henrich, Seattle University, Seattle, WA, Aaron Kaestner, North Park University, Chicago, IL and Sam Nelson, Claremont McKenna College, Claremont, CA, Editors
Publication: Contemporary Mathematics
Publication Year:
2017; Volume 689
ISBNs: 978-1-4704-2847-1 (print); 978-1-4704-4077-0 (online)
DOI: https://doi.org/10.1090/conm/689
Table of Contents
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Front/Back Matter
Articles
- Józef H. Przytycki – The first coefficient of Homflypt and Kauffman polynomials: Vertigan proof of polynomial complexity using dynamic programming
- Mohamed Elhamdadi and Jeremy Kerr – Linear Alexander quandle colorings and the minimum number of colors
- W. Edwin Clark and Masahico Saito – Quandle identities and homology
- Elizabeth Denne, Mary Kamp, Rebecca Terry and Xichen (Catherine) Zhu – Ribbonlength of folded ribbon unknots in the plane
- Heather A. Dye – Checkerboard framings and states of virtual link diagrams
- Micah Chrisman and Aaron Kaestner – Virtual covers of links II
- Erica Flapan, Thomas W. Mattman, Blake Mellor, Ramin Naimi and Ryo Nikkuni – Recent developments in spatial graph theory
- Thomas W. Mattman, Chris Morris and Jody Ryker – Order nine MMIK graphs
- Akio Kawauchi – A chord graph constructed from a ribbon surface-link
- Thomas W. Mattman and Michael Pierce – The $K_{n+5}$ and $K_{3^2,1^n}$ families and obstructions to $n$-apex.
- Atsushi Ishii and Sam Nelson – Partially multiplicative biquandles and handlebody-knots
- Allison Henrich and Louis H. Kauffman – Tangle insertion invariants for pseudoknots, singular knots, and rigid vertex spatial graphs