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Adding Edges to Increase the Chromatic Number of a Graph

Part of: Graph theory

Published online by Cambridge University Press:  31 March 2016

ALEXANDR KOSTOCHKA  and
JAROSLAV NEŠETŘIL
ALEXANDR KOSTOCHKA
Affiliation:
Department of Mathematics, University of Illinois, Urbana, IL 61801, USA and Sobolev Institute of Mathematics, Novosibirsk, Russia (e-mail: kostochk@math.uiuc.edu)
JAROSLAV NEŠETŘIL
Affiliation:
Computer Science Institute of Charles University, Faculty of Mathematics and Physics, Charles University, Malostranské nám. 25, Praha 1, Czech Republic (e-mail nesetril@iuuk.mff.cuni.cz)
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Abstract

If nk + 1 and G is a connected n-vertex graph, then one can add $\binom{k}{2}$ edges to G so that the resulting graph contains the complete graph Kk+1. This yields that for any connected graph G with at least k + 1 vertices, one can add $\binom{k}{2}$ edges to G so that the resulting graph has chromatic number > k. A long time ago, Bollobás suggested that for every k ⩾ 3 there exists a k-chromatic graph Gk such that after adding to it any $\binom{k}{2}$ − 1 edges, the chromatic number of the resulting graph is still k. In this note we prove this conjecture.

MSC classification

Primary: 05C15: Coloring of graphs and hypergraphs
Secondary: 05C35: Extremal problems
Type
Paper
Information
Combinatorics, Probability and Computing , Volume 25 , Issue 4 , July 2016 , pp. 592 - 594
Copyright
Copyright © Cambridge University Press 2016 

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References

[1] Bollobás, B. personal communication.Google Scholar
[2] Descartes, B. (1954) Solution to advanced problem No 4526. Amer. Math. Monthly 61 532.Google Scholar
[3] Kostochka, A. and Nešetřil, J. (1999) Properties of Descartes' construction of triangle-free graphs with high chromatic number. Combin. Probab. Comput. 8 467472.CrossRefGoogle Scholar
[4] Nešetřil, J. (2013) A combinatorial classic: Sparse graphs with high chromatic number. In Erdős Centennial, Springer, pp. 383407.CrossRefGoogle Scholar