On the Tur\'an number of Km C2k-1

Abstract

Given a graph H and a positive integer n, the Tur\'an number of H for the order n, denoted ex(n,H), is the maximum size of a simple graph of order n not containing H as a subgraph. Given graphs G and H, the notation G H means the joint of G and H. (G) denotes the chromatic number of a graph G. Since (Km C2k-1)=m+3 and there is an edge e∈ E(Km C2k-1) such that (Km C2k-1-e)= m+2, by the Simonovits theorem, ex(n, Km C2k-1) = (m+1)n22(m+2) for sufficiently large n. In this paper, we prove that 2(m+2)k-3(m+2)-1 is large enough for n.