Conflict-Free Colouring of Graphs

Conflict-Free Colouring of Graphs

We study the conflict-free chromatic number χCF of graphs from extremal and probabilistic points of view. We resolve a question of Pach and Tardos about the maximum conflict-free chromatic number an n-vertex graph can have. Our construction is randomized. In relation to this we study the evolution o...

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Veröffentlicht in:Combinatorics, probability & computing probability & computing, 2014-05, Vol.23 (3), p.434-448
Hauptverfasser: GLEBOV, ROMAN, SZABÓ, TIBOR, TARDOS, GÁBOR
Format: Artikel
Sprache:eng
Schlagworte:
Asymptotic properties
Colouring
Combinatorial analysis
Construction
Evolution
Graphs
Probabilistic methods
Probability theory
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Zusammenfassung:We study the conflict-free chromatic number χCF of graphs from extremal and probabilistic points of view. We resolve a question of Pach and Tardos about the maximum conflict-free chromatic number an n-vertex graph can have. Our construction is randomized. In relation to this we study the evolution of the conflict-free chromatic number of the Erdős–Rényi random graph G(n,p) and give the asymptotics for p = ω(1/n). We also show that for p ≥ 1/2 the conflict-free chromatic number differs from the domination number by at most 3.
ISSN:0963-5483
1469-2163
DOI:10.1017/S0963548313000540