List circular coloring of trees and cycles

Raspaud, André; Zhu, Xuding

doi:10.1002/jgt.20234

Cited by 7 publications

(7 citation statements)

References 12 publications

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“…This lemma is closely related to the results of Raspaud and Zhu [17]. Lemma 1 can be considered as a more explicit version of their Lemma 2.5 in which the leaves of the tree are required to have color lists of size one.…”

Section: Warming Upmentioning

confidence: 81%

Circular choosability

Havet

Kang

Müller

et al. 2009

Journal of Graph Theory

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International audienceWe study circular choosability, a notion recently introduced by Mohar and by Zhu. First, we provide a negative answer to a question of Zhu about circular cliques. We next prove that cch(G) = O(ch(G) + ln |V(G)|) for every graph G. We investigate a generalisation of circular choosability, the circular f-choosability, where f is a function of the degrees. We also consider the circular choice number of planar graphs. Mohar asked for the value of τ := sup {cch(G) : G is planar}, and we prove that 6<τ>8, thereby providing a negative answer to another question of Mohar. We also study the circular choice number of planar and outerplanar graphs with prescribed girth, and graphs with bounded density

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Section: Warming Upmentioning

confidence: 81%

Circular choosability

Havet

Kang

Müller

et al. 2009

Journal of Graph Theory

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“…In [6], the authors gave a characterization of those for which a tree is -Ô Õµ-choosable, and a characterization of those for which an odd cycle is -´¾ · ½ µ-choosable. The circular chromatic number of a graph has a few equivalent definitions [8].…”

Section: Introductionmentioning

confidence: 99%

Circular choosability of graphs

Zhu

2005

Journal of Graph Theory

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This paper discusses the circular version of list coloring of graphs. We give two definitions of the circular list chromatic number (or circular choosability) Ð´ µ of a graph and prove that they are equivalent. Then we prove that for any graph , Ð´ µ Ð´ µ ½.Examples are given to show that this bound is sharp in the sense that for any¯ ¼, there is a graph with Ð´ µ Ð´ µ ½ ·. It is also proved that -degenerate graphs have Ð´ µ ¾ . This bound is also sharp: for each¯ ¼, there is a -degenerate graph with Ð´ µ ¾ ¯. This shows that Ð´ µ could be arbitrarily larger than Ð´ µ.Finally we prove that if has maximum degree , then Ð´ µ · ½ .

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“…Since its definition by Mohar [4], circular choosability has been studied by several authors including Zhu [17], Havet et al [2], Norine [5], Norine et al [7], Norine and Zhu [8], Raspaud and Zhu [10] and Yu et al [15].…”

Section: Introduction and Statement Of Resultsmentioning

confidence: 99%

Circular choosability is rational

Müller¹,

Waters²

2009

Journal of Combinatorial Theory, Series B

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The circular choosability or circular list chromatic number of a graph is a list-version of the circular chromatic number, that was introduced by Mohar in 2002 and has been studied by several groups of authors since then. One of the nice properties that the circular chromatic number enjoys is that it is a rational number for all finite graphs G, and a fundamental question, posed by Zhu and reiterated by others, is whether the same holds for the circular choosability. In this paper we show that this is indeed the case.

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List circular coloring of trees and cycles

Cited by 7 publications

References 12 publications

Circular choosability

Circular choosability

Circular choosability of graphs

Circular choosability is rational

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