有限离散结构的算法方法。完整图的哈密顿循环和旅行推销员问题

Sergey Kurapov, Maxim Davidovsky, Svetlana Polyuga
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引用次数: 0

摘要

这本专著探讨了在完整图中构建哈密顿循环的问题。基于图的等距循环,建立了构建哈密顿循环的规则。根据顶点之间的距离矩阵,每个循环的权重被确定为其边缘权重的加法和。要构建图的最优路径,需要使用在四个顶点之间寻找最优路径的基本思想。进一步的连续构造旨在连接一个相邻的等距循环,并将顶点数量增加一个单位。递归过程一直持续到图形的所有顶点都连接起来为止。基于所介绍的数学装置,本专著提出了一种解决对称旅行推销员问题的新算法,并提供了一些解决该问题的示例。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Algorithmic methods of finite discrete structures. Hamiltonian cycle of a complete graph and the Traveling salesman problem
The monography considers the problem of constructing a Hamiltonian cycle in a complete graph. A rule for constructing a Hamiltonian cycle based on isometric cycles of a graph is established. An algorithm for constructing a Hamiltonian cycle based on ring summation of isometric cycles of a graph is presented. Based on the matrix of distances between vertices, the weight of each cycle is determined as an additive sum of the weights of its edges. To construct an optimal route of a graph, the basic idea of finding an optimal route between four vertices is used. Further successive constructions are aimed at joining an adjacent isometric cycle with an increase in the number of vertices by one unit. The recursive process continues until all vertices of the graph are connected. Based on the introduced mathematical apparatus, the monography presents a new algorithm for solving the symmetric Traveling salesman problem. Some examples of solving the problem are provided.
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