塔什金诺夫树注释证明

IF 0.6 4区 数学 Q3 MATHEMATICS Graphs and Combinatorics Pub Date : 2023-12-14 DOI:10.1007/s00373-023-02712-1
András Sebő
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引用次数: 0

摘要

塔什基诺夫树已被用作证明色度指数界限的工具,并正在成为边缘着色的基本工具。塔什金诺夫的论文以不同于英语的语言发表,这是否阻碍了塔什金诺夫基本定理的简洁而完整的证明?塔什金诺夫的俄文原著清楚地介绍了这一定理及其证明。定理本身已被很好地理解和成功地应用,但证明却更为困难。它构建了一个真正令人惊叹的递归机器,其中的各种情况都需要经过精炼和完善的分析,才能以惊人的平滑性和准确性相互契合。作者出色地解开了这些难题,值得反复关注。本著作是对塔什金诺夫的证明进行阅读、翻译、重组、改写、补全、简化和注释的结果。它基本上是同一个证明,但在交流上有不可忽略的差异,例如,在必要的地方加以补充,在可能的地方加以简化,同时努力使其适应国际图论界的习惯和口味。
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Tashkinov-Trees: An Annotated Proof

Tashkinov-trees have been used as a tool for proving bounds on the chromatic index, and are becoming a fundamental tool for edge-coloring. Was its publication in a language different from English an obstacle for the accessibility of a clean and complete proof of Tashkinov’s fundamental theorem? Tashkinov’s original, Russian paper offers a clear presentation of this theorem and its proof. The theorem itself has been well understood and successfully applied, but the proof is more difficult. It builds a truly amazing recursive machine, where the various cases necessitate a refined and polished analysis to fit into one another with surprising smoothness and accuracy. The difficulties were brilliantly unknotted by the author, deserving repeated attention. The present work is the result of reading, translating, reorganizing, rewriting, completing, shortcutting and annotating Tashkinov’s proof. It is essentially the same proof, with non-negligeable communicational differences though, for instance completing it wherever it occurred to be necessary, and simplifying it whenever it appeared to be possible, at the same time trying to adapt it to the habits and taste of the international graph theory community.

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来源期刊
Graphs and Combinatorics
Graphs and Combinatorics 数学-数学
CiteScore
1.00
自引率
14.30%
发文量
160
审稿时长
6 months
期刊介绍: Graphs and Combinatorics is an international journal devoted to research concerning all aspects of combinatorial mathematics. In addition to original research papers, the journal also features survey articles from authors invited by the editorial board.
期刊最新文献
An Efficient Algorithm to Compute the Toughness in Graphs with Bounded Treewidth Existential Closure in Line Graphs The Planar Turán Number of $$\{K_4,C_5\}$$ and $$\{K_4,C_6\}$$ On the Complexity of Local-Equitable Coloring in Claw-Free Graphs with Small Degree New Tools to Study 1-11-Representation of Graphs
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