The Relationship Between The Kauffman Bracket Polynomials and The Tutte Polynomials of (2,n)-Torus Knots

A. Şahin, Abdullah Kopuzlu
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Abstract

In knot theory there are many important invariants that are hard to calculate. They are classified as numeric, group and polynomial invariants. These invariants contribute to the problem of classification of knots. In this study, we have done a study on the polynomial invariants of the knots. First of all, for (2,n)-torus knots which is a special class of knots, we calculated their the Kauffman bracket polynomials. We have found a general formula for these calculations. Then the Tutte polynomials of signed graphs of (2,n)-torus knots, marked with a {+} or {-} sign each on edge, have been computed. Some results have been obtained at the end of these calculations. While these researches have been studied, figures and regular diagrams of knots have been applied so much. During the first calculation, we have used skein diagrams and relations of the Kauffman polynomial. In the second calculation, the Tutte polynomials of (2,n)-torus knots have been computed and at the end of the operation some general formulas have been introduced. The signed graphs of (2,n)-torus knots have been obtained by using their regular diagrams. Then the Tutte polynomials of these graphs have been computed as a diagrammatic by recursive formulas that can be defined by deletion-contraction operations. Finally, it has been obtained that there is a relation between the Tutte polynomials and the Kauffman bracket polynomials of (2,n)-torus knots.
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(2,n)-环面结的Kauffman括号多项式与Tutte多项式的关系
在结理论中有许多重要的不变量是很难计算的。它们分为数值不变量、群不变量和多项式不变量。这些不变量有助于结点的分类问题。在本研究中,我们研究了结点的多项式不变量。首先,对于(2,n)环面结点这是一类特殊的结点,我们计算了它们的考夫曼括号多项式。我们已经找到了这些计算的一般公式。然后计算(2,n)个环面结点的带符号图的Tutte多项式,每个结点在边缘上标记一个{+}或{-}符号。在这些计算的最后得到了一些结果。在这些研究中,结的图形和规则图被应用得非常多。在第一次计算中,我们使用了绞丝图和Kauffman多项式的关系。在第二次计算中,计算了(2,n)环面结点的Tutte多项式,并在运算结束时引入了一些一般公式。利用(2,n)环面结的正则图,得到了环面结的符号图。然后,这些图的Tutte多项式通过递归公式被计算为图解,该递归公式可以通过删除-收缩操作来定义。最后,得到了(2,n)-环面结点的Tutte多项式与Kauffman括号多项式之间的关系。
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