P=NP

arXiv - CS - Computational Complexity Pub Date : 2024-05-13 DOI:arxiv-2405.08051

Zikang Deng

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引用次数: 0

摘要

本文研究了一个极其经典的 NP-完备问题：如何确定一个每个顶点的度最多为 4 的图 G 是否可以 3-着色（本文的研究重点是满足每个顶点的度不超过 4 的条件的图 G。为了节省篇幅，本文假设图 G 默认满足这个条件）。笔者仔细观察了着色问题与半定式编程之间的关系，并针对给定的图 G 创造性地构造了相应的半定式编程问题 R(G)，R(G)的构造方法参考了论文中的定理 1.1。我已经得到并证明了结论：当且仅当相应优化问题 R(G) 的目标函数有界，且目标函数有界时，其最小值为 0 时，图 G 是可 3 色的。

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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P=NP

This paper investigates an extremely classic NP-complete problem: How to determine if a graph G, where each vertex has a degree of at most 4, can be 3-colorable(The research in this paper focuses on graphs G that satisfy the condition where the degree of each vertex does not exceed 4. To conserve space, it is assumed throughout the paper that graph G meets this condition by default.). The author has meticulously observed the relationship between the coloring problem and semidefinite programming, and has creatively constructed the corresponding semidefinite programming problem R(G) for a given graph G. The construction method of R(G) refers to Theorem 1.1 in the paper. I have obtained and proven the conclusion: A graph G is 3-colorable if and only if the objective function of its corresponding optimization problem R(G) is bounded, and when the objective function is bounded, its minimum value is 0.

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arXiv - CS - Computational Complexity

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