On the Facial Thue Choice Number of Plane Graphs Via Entropy Compression Method

Przybyło, Jakub; Schreyer, Jens; Škrabuľáková, Erika

doi:10.1007/s00373-015-1642-2

Cited by 17 publications

(15 citation statements)

References 25 publications

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“…Previous applications to graph colouring (e.g. [13,26,3,27,9,11,15]) involved situations where, throughout the algorithm, each vertex is guaranteed to have a large number of available colours to choose from. That is not true in this paper since the degree of a vertex can be much higher than its list-size.…”

Section: Introductionmentioning

confidence: 99%

The list chromatic number of graphs with small clique number

Molloy

2019

Journal of Combinatorial Theory, Series B

106

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Section: Introductionmentioning

confidence: 99%

The list chromatic number of graphs with small clique number

Molloy

2019

Journal of Combinatorial Theory, Series B

106

View full text Add to dashboard Cite

show abstract

“…The best known upper bound is O(log n) where n is the number of vertices, due to Dujmović, Frati, Joret, and Wood [16]. Note that several works have studied colourings of planar graphs in which only facial paths are required to be nonrepetitively coloured [4,8,33,34,44,45,48].…”

Section: Introductionmentioning

confidence: 99%

Planar graphs have bounded nonrepetitive chromatic number

Dujmović

Esperet

Joret

et al. 2020

AiC

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A colouring of a graph is nonrepetitive if for every path of even order, the sequence of colours on the first half of the path is different from the sequence of colours on the second half. We show that planar graphs have nonrepetitive colourings with a bounded number of colours, thus proving a conjecture of Alon, Grytczuk, Hałuszczak and Riordan (2002). We also generalise this result for graphs of bounded Euler genus, graphs excluding a fixed minor, and graphs excluding a fixed topological minor.

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“…For more results on graph colorings we refer the reader to an early survey of Grytczuk [15]. Additionally, a list version of this problem was studied for paths [18], trees [14], and plane graphs [23,24,26] where in the latter two the entropy compression method was used.…”

Section: On Nonrepetitive Colorings Of Graphsmentioning

confidence: 99%

On a Generalization of Thue Sequences

Kranjc¹,

Lužar²,

Mockovčiaková

et al. 2015

Electron. J. Combin.

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A sequence is Thue or nonrepetitive if it does not contain a repetition of any length. We consider a generalization of this notion. A $j$-subsequence of a sequence $S$ is a subsequence in which two consecutive terms are at indices of difference $j$ in $S$. A $k$-Thue sequence is a sequence in which every $j$-subsequence, for $1\le j \le k$, is also Thue. It was conjectured that $k+2$ symbols are enough to construct an arbitrarily long $k$-Thue sequence and shown that the conjecture holds for $k \in \{2,3,5\}$. In this paper we present a construction of $k$-Thue sequences on $2k$ symbols, which improves the previous bound of $2k + 10\sqrt{k}$. Additionaly, we define cyclic $k$-Thue sequences and present a construction of such sequences of arbitrary lengths when $k=2$ using four symbols, with three exceptions. As a corollary, we obtain tight bounds for total Thue colorings of cycles. We conclude the paper with some open problems.

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On the Facial Thue Choice Number of Plane Graphs Via Entropy Compression Method

Cited by 17 publications

References 25 publications

The list chromatic number of graphs with small clique number

The list chromatic number of graphs with small clique number

Planar graphs have bounded nonrepetitive chromatic number

On a Generalization of Thue Sequences

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