Add to ORKGIn this note we give a closed-form formula for the Kauff-man bracket of pretzel links. In particular this formula allows us to calculate the span of the Jones polynomial of any pretzel link (compare to partial results obtained in [1])
AbstractTutte polynomials are important graph invariants with rich applications in combinatorics, to...
AbstractIn this paper we use the orientation of a link to introduce an additional structure on Kauff...
The purpose of this article is to give a survey of the present impact of the Jones polynomial on the...
We give an alternate expansion of the colored Jones polynomial of a pretzel link which recovers the ...
In this paper, we define a family of links which are similar to but more complex than Pretzel links....
We introduce a simple recursive relation and give an explicit formula of the Kauffman bracket of two...
We show that the Kauffman bracket [L] of a checkerboard colorable virtual link L is an evaluation of...
The Jones Polynomial is a specific knot invariant that can yield extremely useful information; howev...
We show that the Kauffman bracket [L] of a checkerboard colorable virtual link L is an evaluation of...
Using the colored Kauffman skein relation, we study the highest and lowest 4n coefficients of the nt...
This thesis uses Kauffman skein theory to give several new results. We show a correspondence between...
AbstractA very simple expression is conjectured for arbitrary colored Jones and HOMFLY polynomials o...
this paper we take the Kauffman bracket for links in a solid torus (see [16]) as a known invariant t...
9 pages, 2 figures, 4 tableaux.We compute the Kauffman bracket polynomial of the three-lead Turk's h...
We construct arbitrarily many skein equivalent 2-bridge knots (resp. links) with the same Kauffman p...
AbstractTutte polynomials are important graph invariants with rich applications in combinatorics, to...
AbstractIn this paper we use the orientation of a link to introduce an additional structure on Kauff...
The purpose of this article is to give a survey of the present impact of the Jones polynomial on the...
We give an alternate expansion of the colored Jones polynomial of a pretzel link which recovers the ...
In this paper, we define a family of links which are similar to but more complex than Pretzel links....
We introduce a simple recursive relation and give an explicit formula of the Kauffman bracket of two...
We show that the Kauffman bracket [L] of a checkerboard colorable virtual link L is an evaluation of...
The Jones Polynomial is a specific knot invariant that can yield extremely useful information; howev...
We show that the Kauffman bracket [L] of a checkerboard colorable virtual link L is an evaluation of...
Using the colored Kauffman skein relation, we study the highest and lowest 4n coefficients of the nt...
This thesis uses Kauffman skein theory to give several new results. We show a correspondence between...
AbstractA very simple expression is conjectured for arbitrary colored Jones and HOMFLY polynomials o...
this paper we take the Kauffman bracket for links in a solid torus (see [16]) as a known invariant t...
9 pages, 2 figures, 4 tableaux.We compute the Kauffman bracket polynomial of the three-lead Turk's h...
We construct arbitrarily many skein equivalent 2-bridge knots (resp. links) with the same Kauffman p...
AbstractTutte polynomials are important graph invariants with rich applications in combinatorics, to...
AbstractIn this paper we use the orientation of a link to introduce an additional structure on Kauff...
The purpose of this article is to give a survey of the present impact of the Jones polynomial on the...