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A New Bound for the 2/3 Conjecture

Published online by Cambridge University Press:  23 January 2013

DANIEL KRÁL'
Affiliation:
Institute of Mathematics, DIMAP and Department of Computer Science, University of Warwick, Coventry CV4 7AL, UK (e-mail: D.Kral@warwick.ac.uk)
CHUN-HUNG LIU
Affiliation:
School of Mathematics, Georgia Institute of Technology, Atlanta, GA 30332, USA (e-mail: cliu87@math.gatech.edu, pwhalen3@math.gatech.edu)
JEAN-SÉBASTIEN SERENI
Affiliation:
CNRS (LORIA), Nancy, France (e-mail: sereni@kam.mff.cuni.cz)
PETER WHALEN
Affiliation:
School of Mathematics, Georgia Institute of Technology, Atlanta, GA 30332, USA (e-mail: cliu87@math.gatech.edu, pwhalen3@math.gatech.edu)
ZELEALEM B. YILMA
Affiliation:
LIAFA (Université Denis Diderot), Paris, France (e-mail: Zelealem.Yilma@liafa.jussieu.fr)

Abstract

We show that any n-vertex complete graph with edges coloured with three colours contains a set of at most four vertices such that the number of the neighbours of these vertices in one of the colours is at least 2n/3. The previous best value, proved by Erdős, Faudree, Gould, Gyárfás, Rousseau and Schelp in 1989, is 22. It is conjectured that three vertices suffice.

Type
Paper
Copyright
Copyright © Cambridge University Press 2013

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Footnotes

This work was done in the framework of LEA STRUCO.

References

[1]Baber, R. Turán densities of hypercubes. Submitted. arXiv:1201.3587.Google Scholar
[2]Baber, R. and Talbot, J. (2011) Hypergraphs do jump. Combin. Probab. Comput. 20 161171.Google Scholar
[3]Baber, R. and Talbot, J. (2012) New Turán densities for 3-graphs. Electron. J. Combin. 19 R22.Google Scholar
[4]Balogh, J., Hu, P., Lidický, B. and Liu, H. Upper bounds on the size of 4- and 6-cycle-free subgraphs of the hypercube. Submitted. arXiv:1201.0209.Google Scholar
[5]Borgs, C., Chayes, J. T., Lovász, L., Sós, V. T. and Vesztergombi, K. (2008) Convergent sequences of dense graphs I: Subgraph frequencies, metric properties and testing. Adv. Math. 219 18011851.CrossRefGoogle Scholar
[6]Cummings, J., Král', D., Pfender, F., Sperfeld, K., Treglown, A. and Young, M. Monochromatic triangles in three-coloured graphs. Submitted. arXiv:1206.1987.Google Scholar
[7]Erdős, P., Faudree, R., Gyárfás, A. and Schelp, R. H. (1989) Domination in colored complete graphs. J. Graph Theory 13 713718.CrossRefGoogle Scholar
[8]Erdős, P., Faudree, R. J., Gould, R. J., Gyárfás, A., Rousseau, C. and Schelp, R. H. (1990) Monochromatic coverings in colored complete graphs. In Proc. Twentieth Southeastern Conference on Combinatorics, Graph Theory, and Computing. Congr. Numer. 71 2938.Google Scholar
[9]Erdős, P. and Hajnal, A. (1989) Ramsey-type theorems. In Combinatorics and Complexity. Discrete Appl. Math. 25 3752.Google Scholar
[10]Falgas-Ravry, V. and Vaughan, E. R. On applications of Razborov's flag algebra calculus to extremal 3-graph theory. Submitted. arXiv:1110.1623.Google Scholar
[11]Falgas-Ravry, V. and Vaughan, E. R. Turán H-densities for 3-graphs. Submitted. arXiv:1201.4326.Google Scholar
[12]Grzesik, A. (2012) On the maximum number of five-cycles in a triangle-free graph. J. Combin. Theory Ser. B 102 10611066.Google Scholar
[13]Hatami, H., Hirst, J. and Norine, S. The inducibility of blow-up graphs. Submitted. arXiv:1108.5699.Google Scholar
[14]Hatami, H., Hladký, J., Král', D., Norine, S. and Razborov, A. On the number of pentagons in triangle-free graphs. J. Combin. Theory Ser. A. Submitted. arXiv:1102.1634.Google Scholar
[15]Hatami, H., Hladký, J., Král', D., Norine, S. and Razborov, A. (2012) Non-three-colourable common graphs exist. Combin. Probab. Comput. 21 734742.Google Scholar
[16]Hirst, J. The inducibility of graphs on four vertices. Submitted. arXiv:1109.1592.Google Scholar
[17]Hladký, J., Král', D. and Norine, S. Counting flags in triangle-free digraphs. Submitted. arXiv:0908.2791.Google Scholar
[18]Král', D., Liu, C.-H., Sereni, J.-S., Whalen, P. and Yilma, Z. B. A new bound for the 2/3 conjecture. arXiv:1204.2519.Google Scholar
[19]Král', D., Mach, L. and Sereni, J.-S. (2012) A new lower bound based on Gromov's method of selecting heavily covered points. Discrete Comput. Geom. 48 487498.Google Scholar
[20]Kramer, L., Martin, R. R. and Young, M. On diamond-free subposets of the Boolean lattice. J. Combin. Theory Ser. A. Submitted. arXiv:1205.1501.Google Scholar
[21]Lovász, L. and Szegedy, B. (2006) Limits of dense graph sequences. J. Combin. Theory Ser. B 96 933957.Google Scholar
[22]Pikhurko, O. Minimum number of k-cliques in graphs with bounded independence number. Submitted. arXiv:1203.4393.Google Scholar
[23]Pikhurko, O. and Razborov, A. Asymptotic structure of graphs with the minimum number of triangles. Submitted. arXiv:1204.2846.Google Scholar
[24]Razborov, A. (2007) Flag algebras. J. Symbolic Logic 72 12391282.Google Scholar
[25]Razborov, A. (2008) On the minimal density of triangles in graphs. Combin. Probab. Comput. 17 603618.Google Scholar
[26]Razborov, A. (2010) On 3-hypergraphs with forbidden 4-vertex configurations. SIAM J. Discrete Math. 24 946963.Google Scholar
[27]Tychonoff, A. (1930) Über die topologische Erweiterung von Räumen. Math. Ann. 102 544561.CrossRefGoogle Scholar