The number of edges in graphs with bounded clique number and circumference

Abstract

Let H be a family of graphs. The Tur\'an number ex(n, H) is the maximum possible number of edges in an n-vertex graph which does not contain any member of H as a subgraph. As a common generalization of Tur\'an's theorem and Erdos-Gallai theorem on the Tur\'an number of matchings, Alon and Frankl determined ex(n, H) for H=\Kr,Mk\, where Mk is a matching of size k. Replacing Mk by Pk, Katona and Xiao obtained the Tur\'an number of H=\Kr,Pk\ for r ≤ k/2 and sufficiently large n. In addition, they proposed a conjecture for the case of r ≥ k/2 +1 and sufficiently large n. Motivated by the fact that the result for ex(n,Pk) can be deduced from the one for ex(n, C≥ k), we investigate the Tur\'an number of H=\Kr, C≥ k\ in this paper. In other words, we aim to determine the maximum number of edges in graphs with clique number at most r-1 and circumference at most k-1. For H=\Kr, C≥ k\, we are able to show the value of ex(n, H) for r ≥ (k-1)/2+2 and all n. As an application of this result, we confirm Katona and Xiao's conjecture in a stronger form. For r ≤ (k-1)/2+1, we manage to show the value of ex(n, H) for sufficiently large n.

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