Tur\'an number of complete bipartite graphs with bounded matching number

Abstract

Let F be a family of graphs. A graph G is F-free if G does not contain any F∈ F as a subgraph. The Tur\'an number ex(n, F) is the maximum number of edges in an n-vertex F-free graph. Let Ms be the matching consisting of s independent edges. Recently, Alon and Frank determined the exact value of ex(n,\Km,Ms+1\). Gerbner obtained several results about ex(n,\F,Ms+1\) when F satisfies certain proportions. In this paper, we determine the exact value of ex(n,\Kl,t,Ms+1\) when s, n are large enough for every 3≤ l≤ t. When n is large enough, we also show that ex(n,\K2,2, Ms+1\)=n+s 2-s2 for s 12 and ex(n,\K2,t,Ms+1\)=n+(t-1)s 2-s2 when t 3 and s is large enough.