Extremal numbers for odd cycles
Combinatorics
2015-06-03 v1
Abstract
We describe the C_{2k+1}-free graphs on n vertices with maximum number of edges. The extremal graphs are unique except for n = 3k-1, 3k, 4k-2, or 4k-1. The value of ex(n,C_{2k+1}) can be read out from the works of Bondy, Woodall, and Bollobas, but here we give a new streamlined proof. The complete determination of the extremal graphs is also new. We obtain that the bound for n_0(C_{2k+1}) is 4k in the classical theorem of Simonovits, from which the unique extremal graph is the bipartite Turan graph.
Keywords
Cite
@article{arxiv.1310.6766,
title = {Extremal numbers for odd cycles},
author = {Zoltan Füredi and David S. Gunderson},
journal= {arXiv preprint arXiv:1310.6766},
year = {2015}
}
Comments
6 pages