论文标题
琼斯多项式的系数
The coefficients of the Jones polynomial
论文作者
论文摘要
众所周知,在$ e^x $中评估的琼斯多项式的系列扩展的系数是有价值的Vassiliev不变的。在本文中,我们计算了这些有理价值不变的乘积所需的最小乘法因子λ,以成为整数有价值的Vassiliev不变性。通过这样做,我们获得了一组数字值的Vassiliev不变式。
It has been known that, the coefficients of the series expansion of the Jones polynomial evaluated at $e^x$ are rational valued Vassiliev invariants . In this article, we calculate minimal multiplying factor, λ, needed for these rational valued invariants to become integer valued Vassiliev invariants. By doing that we obtain a set of integer-valued Vassiliev invariants.
