Extremal problems for a matching and any other graph

Abstract

For a family of graphs , a graph is called -free if it does not contain any member of as a subgraph. The generalized Tur\'an number (n,Kr,) is the maximum number of Kr in an n-vertex -free graph and (n,K2,)=(n,), i.e., the classical Tur\'an number. Let Ms+1 be a matching on s+1 edges and F be any graph. In this paper, we determine (n,Kr, \Ms+1,F\) apart from a constant additive term and also give a condition when the error constant term can be determined. In particular, we give the exact value of (n,\Ms+1,F\) for F being any non-bipartite graph or some bipartite graphs. Furthermore, we determine (n,Kr,\Ms+1,F\) when F is color critical with (F) \r+1,4\. These extend the results in [2,11,18].