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On the Number of Edges in Colour-Critical Graphs and Hypergraphs

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is called k-critical if it has chromatic number k, but every proper sub(hyper)graph of it is (k-1)-colourable. We prove that for sufficiently large k, every k-critical triangle-free graph on n vertices has at least (k-o(k))n edges. Furthermore, we show that every (k+1)-critical hypergraph on n vertices and without graph edges has at least edges. Both bounds differ from the best possible bounds by o(kn) even for graphs or hypergraphs of arbitrary girth.

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Authors and Affiliations

  1. Institute of Mathematics; 630090 Novosibirsk, Russia; and University of Illinois at Urbana-Chamaign; Urbana, IL61801, USA; E-mail: kostochk@math.uiuc.edu, , , , , , RU

    A. V. Kostochka

  2. Ilmenau Technical University; 98684 Ilmenau, Germany; E-mail: stieb@mathametik.tu-ilmenau.de, , , , , , DE

    M. Stiebitz

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  1. A. V. Kostochka
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  2. M. Stiebitz
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Received June 25, 1998

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Kostochka, A., Stiebitz, M. On the Number of Edges in Colour-Critical Graphs and Hypergraphs. Combinatorica 20, 521–530 (2000). https://doi.org/10.1007/s004930070005

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  • DOI: https://doi.org/10.1007/s004930070005

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