Based on knot theory and graph theory, the paper simplifies the computation for HOMFLY polynomial of polyhedral links.
基于纽结理论和图论,文章简化了多面体链环的HOMFLY多项式的计算。
Based on that, the relationships between the W-polynomial of a polyhedral graph and the HOMFLY polynomials of four kinds of polyhedral links are established.
以此为基础,我们建立了一个多面体图的W -多项式和四类链环的HOMFLY多项式之间的关系。
These relationships not only expand the general formula of HOMFLY polynomial into a family of polyhedral links but also simply the computation for HOMFLY polynomial of some special polyhedral links.
这些关系式不仅将HOMFLY多项式的通式扩展到一族多面体链环上并且可以简化计算一些特殊的多面体链环类的HOMFLY多项式。
These relationships not only expand the general formula of HOMFLY polynomial into a family of polyhedral links but also simply the computation for HOMFLY polynomial of some special polyhedral links.
这些关系式不仅将HOMFLY多项式的通式扩展到一族多面体链环上并且可以简化计算一些特殊的多面体链环类的HOMFLY多项式。
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