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Related papers: Multi-switches and virtual knot invariants

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We define a family of generalizations of the two-variable quandle polynomial. These polynomial invariants generalize in a natural way to eight-variable polynomial invariants of finite biquandles. We use these polynomials to define a family…

Quantum Algebra · Mathematics 2019-08-15 Sam Nelson

For an oriented knot $K$, we construct a functor from the category of pointed quandles to the category of quandles in three different ways. We also extend the quandle cocycle invariants of knots by using these quandle-valued invariant of…

Geometric Topology · Mathematics 2014-06-11 Tetsuya Ito

The writhe polynomial is a fundamental invariant of an oriented virtual knot. We introduce a kind of local moves for oriented virtual knots called shell moves. The first aim of this paper is to prove that two oriented virtual knots have the…

Geometric Topology · Mathematics 2019-05-10 Takuji Nakamura , Yasutaka Nakanishi , Shin Satoh

A virtual knot, which is one of generalizations of knots in $\mathbb{R}^{3}$ (or $S^{3}$), is, roughly speaking, an embedded circle in thickened surface $S_{g} \times I$. In this talk we will discuss about knots in 3 dimensional $S_{g}…

Geometric Topology · Mathematics 2022-01-03 Seongjeong Kim

We introduce a new polynomial invariant of virtual knots and links and use this invariant to compute a lower bound on the virtual crossing number and the minimal surface genus.

Geometric Topology · Mathematics 2009-02-24 H. A. Dye , Louis H. Kauffman

We consider an algebra of (classical or virtual) tangles over an ordered circuit operad and introduce Conway-type invariants of tangles which respect this algebraic structure. The resulting invariants contain both the coefficients of the…

Geometric Topology · Mathematics 2010-11-30 Michael Polyak

In this paper we study the chord index of virtual knots, which can be thought of as an extension of the chord parity. We show how to use the chord index to define finite type invariants of virtual knots. The notions of indexed Jones…

Geometric Topology · Mathematics 2026-05-26 Zhiyun Cheng

We enhance the pointed quandle counting invariant of linkoids through the use of quivers analogously to quandle coloring quivers. This allows us to generalize the in-degree polynomial invariant of links to linkoids. Additionally, we…

Algebraic Topology · Mathematics 2025-10-15 Jose Ceniceros , Max Klivans

Given a group endowed with a Z/2-valued morphism we associate a Gauss diagram theory, and show that for a particular choice of the group these diagrams encode faithfully virtual knots on a given arbitrary surface. This theory contains all…

Geometric Topology · Mathematics 2014-03-17 Arnaud Mortier

We introduce and study in detail an invariant of (1,1) tangles. This invariant, derived from a family of four dimensional representations of the quantum superalgebra U_q[gl(2|1)], will be referred to as the Links-Gould invariant. We find…

Geometric Topology · Mathematics 2009-09-25 David De Wit , Louis H Kauffman , Jon R Links

Quandle Coloring Quivers are directed graph-valued invariants of classical and virtual knots and links associated to finite quandles. Quandle action quivers are subquivers of the full quandle coloring quiver associated to quandle actions by…

Geometric Topology · Mathematics 2024-04-02 Mason Cai , Sam Nelson

We extend the quandle cocycle invariant to the context of stuck links. More precisely, we define an invariant of stuck links by assigning Boltzmann weights at both classical and stuck crossings. As an application, we define a…

Geometric Topology · Mathematics 2023-03-29 Jose Ceniceros , Mohamed Elhamdadi , Brendan Magill , Gabriana Rosario

This paper defines the concept of an oriented quantum algebra and develops its application to the construction of quantum link invariants. We show that all known quantum link invariants can be put into this framework.

Geometric Topology · Mathematics 2007-05-23 Louis H. Kauffman , David E. Radford

This paper introduces two virtual knot theory ``analogues'' of a well-known family of invariants for knots in thickened surfaces: the Grishanov-Vassiliev finite-type invariants of order two. The first, called the three loop isotopy…

Geometric Topology · Mathematics 2013-09-13 Micah W. Chrisman , H. A. Dye

We introduce a notion of topological quandle. Given a topological quandle $Q$ we associate to every classical link $L$ in $\R ^3$ an invariant $J_Q(L)$ which is a topological space (defined up to a homeomorphism). The space $J_Q(L)$ can be…

Geometric Topology · Mathematics 2007-05-23 Ryszard L. Rubinsztein

We construct an invariant of virtual knots which is a sliceness obstruction and sensitive to the $\Delta$-move. This invariants works if $\Z_{2}\oplus \Z_{2}$-index of chords is present.

Geometric Topology · Mathematics 2022-01-04 Vassily Olegovich Manturov

The usual construction of link invariants from quantum groups applied to the superalgebra D_{2 1,alpha} is shown to be trivial. One can modify this construction to get a two variable invariant. Unusually, this invariant is additive with…

Geometric Topology · Mathematics 2009-03-06 Bertrand Patureau-Mirand

Biracks are algebraic structures related to knots and links. We define a new enhancement of the birack counting invariant for oriented classical and virtual knots and links via algebraic structures called birack dynamical cocycles. The new…

Geometric Topology · Mathematics 2012-05-22 Sam Nelson , Emily Watterberg

In this work we describe a new invariant of virtual knots. We show that this transcendental function invariant generalizes several polynomial invariants of virtual knots, such as the writhe polynomial, the affine index polynomial and the…

Geometric Topology · Mathematics 2017-11-03 Zhiyun Cheng

We introduce a new equivalence relation on decorated ribbon graphs, and show that its equivalence classes directly correspond to virtual links. We demonstrate how this correspondence can be used to convert any invariant of virtual links…

Geometric Topology · Mathematics 2022-02-01 Scott Baldridge , Louis H. Kauffman , William Rushworth