Vertex-disjoint properly edge-colored cycles in edge-colored complete graphs

Ruonan Li; Hajo Broersma; Shenggui Zhang

doi:10.1002/jgt.22536

Vertex-disjoint properly edge-colored cycles in edge-colored complete graphs

Ruonan Li
, Hajo Broersma
, Shenggui Zhang

数学与统计学院

Northwestern Polytechnical University Xian
University of Twente

科研成果: 期刊稿件 › 文章 › 同行评审

10 引用（Scopus）

摘要

It is conjectured that every edge-colored complete graph (Formula presented.) on (Formula presented.) vertices satisfying (Formula presented.) contains (Formula presented.) vertex-disjoint properly edge-colored cycles. We confirm this conjecture for (Formula presented.), prove several additional weaker results for general (Formula presented.), and we establish structural properties of possible minimum counterexamples to the conjecture. We also reveal a close relationship between properly edge-colored cycles in edge-colored complete graphs and directed cycles in multipartite tournaments. Using this relationship and our results on edge-colored complete graphs, we obtain several partial solutions to a conjecture on disjoint cycles in directed graphs due to Bermond and Thomassen.

源语言	英语
页（从-至）	476-493
页数	18
期刊	Journal of Graph Theory
卷	94
期	3
DOI	https://doi.org/10.1002/jgt.22536
出版状态	已出版 - 1 7月 2020

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abstract = "It is conjectured that every edge-colored complete graph (Formula presented.) on (Formula presented.) vertices satisfying (Formula presented.) contains (Formula presented.) vertex-disjoint properly edge-colored cycles. We confirm this conjecture for (Formula presented.), prove several additional weaker results for general (Formula presented.), and we establish structural properties of possible minimum counterexamples to the conjecture. We also reveal a close relationship between properly edge-colored cycles in edge-colored complete graphs and directed cycles in multipartite tournaments. Using this relationship and our results on edge-colored complete graphs, we obtain several partial solutions to a conjecture on disjoint cycles in directed graphs due to Bermond and Thomassen.",

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AU - Broersma, Hajo

AU - Zhang, Shenggui

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N2 - It is conjectured that every edge-colored complete graph (Formula presented.) on (Formula presented.) vertices satisfying (Formula presented.) contains (Formula presented.) vertex-disjoint properly edge-colored cycles. We confirm this conjecture for (Formula presented.), prove several additional weaker results for general (Formula presented.), and we establish structural properties of possible minimum counterexamples to the conjecture. We also reveal a close relationship between properly edge-colored cycles in edge-colored complete graphs and directed cycles in multipartite tournaments. Using this relationship and our results on edge-colored complete graphs, we obtain several partial solutions to a conjecture on disjoint cycles in directed graphs due to Bermond and Thomassen.

AB - It is conjectured that every edge-colored complete graph (Formula presented.) on (Formula presented.) vertices satisfying (Formula presented.) contains (Formula presented.) vertex-disjoint properly edge-colored cycles. We confirm this conjecture for (Formula presented.), prove several additional weaker results for general (Formula presented.), and we establish structural properties of possible minimum counterexamples to the conjecture. We also reveal a close relationship between properly edge-colored cycles in edge-colored complete graphs and directed cycles in multipartite tournaments. Using this relationship and our results on edge-colored complete graphs, we obtain several partial solutions to a conjecture on disjoint cycles in directed graphs due to Bermond and Thomassen.

KW - complete graph

KW - edge-colored graph

KW - multipartite tournament

KW - properly edge-colored cycle

KW - vertex-disjoint cycles

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JO - Journal of Graph Theory

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Vertex-disjoint properly edge-colored cycles in edge-colored complete graphs

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