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The Minimum Number of Triangular Edges and a Symmetrization Method for Multiple Graphs

Published online by Cambridge University Press:  23 January 2017

ZOLTÁN FÜREDI
Affiliation:
Alfréd Rényi Institute of Mathematics, 13–15 Reáltanoda Street, 1053 Budapest, Hungary (e-mail: [email protected])
ZEINAB MALEKI
Affiliation:
Department of Mathematical Sciences, Isfahan University of Technology, Isfahan 84156-83111, Iran (e-mail: [email protected])

Abstract

We give an asymptotic formula for the minimum number of edges contained in triangles among graphs with n vertices and e edges. Our main tool is a generalization of Zykov's symmetrization method that can be applied to several graphs simultaneously.

Type
Paper
Copyright
Copyright © Cambridge University Press 2017 

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References

[1] Chung, F. and Graham, R. (1998) Erdős on Graphs: His Legacy of Unsolved Problems, A. K. Peters.Google Scholar
[2] Erdős, P. (1997) Some recent problems and results in graph theory. Discrete Math. 164 8185.Google Scholar
[3] Erdős, P., Faudree, R. J. and Rousseau, C. C. (1992) Extremal problems involving vertices and edges on odd cycles. Discrete Math. 101 2331.Google Scholar
[4] Füredi, Z. and Maleki, Z. (2014) The minimum number of triangular edges and a symmetrization for multiple graphs. arXiv:1411.0771 Google Scholar
[5] Füredi, Z. and Maleki, Z. A proof and a counterexample for a conjecture of Erdős concerning the minimum number of edges in odd cycles. Manuscript.Google Scholar
[6] Gruslys, V. and Letzter, S. (2016) Minimising the number of triangular edges. arXiv:1605.00528 Google Scholar
[7] Grzesik, A., Hu, P. and Volec, J. (2016) Minimum number of edges that occur in odd cycles. Manuscript.Google Scholar
[8] Motzkin, T. S. and Straus, E. G. (1965) Maxima for graphs and a new proof of a theorem of Turán. Canad. J. Math. 17 533540.Google Scholar
[9] Turán, P. (1941) On an extremal problem in graph theory (in Hungarian). Matematikai és Fizikai Lapok 48 436452.Google Scholar
[10] Zykov, A. A. (1949) On some properties of linear complexes (in Russian). Mat. Sbornik (NS) 24 163188.Google Scholar