Vassiliev invariants as polynomials
Simon Willerton (1998)
Banach Center Publications
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Three results are shown which demonstrate how Vassiliev invariants behave like polynomials.
Displaying similar documents to “Homfly polynomials as vassiliev link invariants”
Vassiliev invariants as polynomials
A glimpse at knot theory
Paweł Traczyk (1995)
Banach Center Publications
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From astrology to topology via Feynman diagrams and Lie algebras
Bar-Natan, Dror
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Summary of the three lectures. These notes are available electronically at http://www.ma.huji.ac.il/~drorbn/Talks/Srni-9901/notes.html.
Search for different links with the same Jones' type polynomials: Ideas from graph theory and statistical mechanics
Józef Przytycki (1995)
Banach Center Publications
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We describe in this talk three methods of constructing different links with the same Jones type invariant. All three can be thought as generalizations of mutation. The first combines the satellite construction with mutation. The second uses the notion of rotant, taken from the graph theory, the third, invented by Jones, transplants into knot theory the idea of the Yang-Baxter equation with the spectral parameter (idea employed by Baxter in the theory of solvable models in statistical...
Link invariants from finite biracks
Sam Nelson (2014)
Banach Center Publications
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A birack is an algebraic structure with axioms encoding the blackboard-framed Reidemeister moves, incorporating quandles, racks, strong biquandles and semiquandles as special cases. In this paper we extend the counting invariant for finite racks to the case of finite biracks. We introduce a family of biracks generalizing Alexander quandles, (t,s)-racks, Alexander biquandles and Silver-Williams switches, known as (τ,σ,ρ)-biracks. We consider enhancements of the counting invariant using...
The writhes of a virtual knot
Shin Satoh, Kenta Taniguchi (2014)
Fundamenta Mathematicae
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Kauffman introduced a fundamental invariant of a virtual knot called the odd writhe. There are several generalizations of the odd writhe, such as the index polynomial and the odd writhe polynomial. In this paper, we define the n-writhe for each non-zero integer n, which unifies these invariants, and study various properties of the n-writhe.
3-coloring and other elementary invariants of knots
Józef Przytycki (1998)
Banach Center Publications
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A conjecture on Khovanov's invariants
Stavros Garoufalidis (2004)
Fundamenta Mathematicae
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We formulate a conjectural formula for Khovanov's invariants of alternating knots in terms of the Jones polynomial and the signature of the knot.
On numerical invariants for knots in the solid torus
Khaled Bataineh (2015)
Open Mathematics
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We define some new numerical invariants for knots with zero winding number in the solid torus. These invariants explore some geometric features of knots embedded in the solid torus. We characterize these invariants and interpret them on the level of the knot projection. We also find some relations among some of these invariants. Moreover, we give lower bounds for some of these invariants using Vassiliev invariants of type one. We connect our invariants to the bridge number in the solid...