Add to ORKGWe construct arbitrarily many skein equivalent 2-bridge knots (resp. links) with the same Kauffman polynomial (resp. Kauffman and 2-variable Alexander polynomials). We also consider a similar example for a 3-braid knot or link
ABSTRACT. A multi-crossing (or n-crossing) is a singular point in a projection at which n strands cr...
We give a simple and practical algorithm to compute the link polynomials, which are defined accordin...
We present the new skein invariants of classical links, H [ H ] , K [ K ] and D [...
This thesis uses Kauffman skein theory to give several new results. We show a correspondence between...
Every two-bridge knot or link is characterized by a rational number p/q, and has a fundamental group...
In this MSc thesis, which deals with certain topics from knot theory, we will engage with the proble...
AbstractWe study relationships between the colored Jones polynomial and the A-polynomial of a knot. ...
AbstractWe give an explicit formula for the fact given by Links and Gould that a one variable reduct...
Every two-bridge knot or link is characterized by a rational number p/q, and has a fundamental group...
We give necessary conditions for a polynomial to be the Conway polynomial of a two-bridge link. As a...
We propose a new, precise integrality conjecture for the colored Kauffman polynomial of knots and li...
We investigate the twisted Alexander polynomial of a 2-bridge knot associated to a Fox coloring. For...
Abstract It is known that alternative links are pseudoalternating. In 1983 Louis Kauff-man conjectur...
We conjecture a relationship between the Hilbert schemes of points on a singular plane curve and the...
We introduce a simple recursive relation and give an explicit formula of the Kauffman bracket of two...
ABSTRACT. A multi-crossing (or n-crossing) is a singular point in a projection at which n strands cr...
We give a simple and practical algorithm to compute the link polynomials, which are defined accordin...
We present the new skein invariants of classical links, H [ H ] , K [ K ] and D [...
This thesis uses Kauffman skein theory to give several new results. We show a correspondence between...
Every two-bridge knot or link is characterized by a rational number p/q, and has a fundamental group...
In this MSc thesis, which deals with certain topics from knot theory, we will engage with the proble...
AbstractWe study relationships between the colored Jones polynomial and the A-polynomial of a knot. ...
AbstractWe give an explicit formula for the fact given by Links and Gould that a one variable reduct...
Every two-bridge knot or link is characterized by a rational number p/q, and has a fundamental group...
We give necessary conditions for a polynomial to be the Conway polynomial of a two-bridge link. As a...
We propose a new, precise integrality conjecture for the colored Kauffman polynomial of knots and li...
We investigate the twisted Alexander polynomial of a 2-bridge knot associated to a Fox coloring. For...
Abstract It is known that alternative links are pseudoalternating. In 1983 Louis Kauff-man conjectur...
We conjecture a relationship between the Hilbert schemes of points on a singular plane curve and the...
We introduce a simple recursive relation and give an explicit formula of the Kauffman bracket of two...
ABSTRACT. A multi-crossing (or n-crossing) is a singular point in a projection at which n strands cr...
We give a simple and practical algorithm to compute the link polynomials, which are defined accordin...
We present the new skein invariants of classical links, H [ H ] , K [ K ] and D [...