多虚拟结理论

arXiv - MATH - Geometric Topology Pub Date : 2024-09-10 DOI:arxiv-2409.07499

Louis H Kauffman

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摘要

本文讨论的是虚结理论的一种概括，我们称之为多虚结理论。多虚结理论使用虚交叉类型的多重性。正如我们将要解释的那样，这种多重性的产生是由于它首先是在图论环境中产生的，与将平面三价图着色的彭罗斯评估推广到所有三价图有关，后来又在虚拟结理论中得到了应用。因此，本文首先将图论作为我们构造的基础，然后探讨多虚结和链接的拓扑学。论文的第二部分是对我们之前工作的回顾（SearXiv:1511.06844）。有兴趣了解我们对最初彭罗斯评估的概括的读者，可以从本文开头开始阅读图论。对多虚拟结和链接感兴趣的读者可以从第 4 节开始阅读，并参考本文的前半部分。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Multi-Virtual Knot Theory

This paper discusses a generalization of virtual knot theory that we call multi-virtual knot theory. Multi-virtual knot theory uses a multiplicity of types of virtual crossings. As we will explain, this multiplicity is motivated by the way it arises first in a graph-theoretic setting in relation to generalizing the Penrose evaluation for colorings of planar trivalent graphs to all trivalent graphs, and later by its uses in a virtual knot theory. As a consequence, the paper begins with the graph theory as a basis for our constructions, and then proceeds to the topology of multi-virtual knots and links. The second section of the paper is a review of our previous work (See arXiv:1511.06844). The reader interested in seeing our generalizations of the original Penrose evaluation, can begin this paper at the beginning and see the graph theory. A reader primarily interested in multi-virtual knots and links can begin reading in section 4 with references to the earlier part of the paper.

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