Tur\'an problems for linear forests and cliques

Abstract

Given a graph T and a family of graphs H. The generalized Tur\'an number of H is the maximum number of copies of T in an H-free graph on n vertices, denoted by ex(n, T, H). Let ex(n, T, H) denote the maximum number of copies of T in an n-vertex H-free graph. Recently, Alon and Frankl (arXiv2210.15076) determined the exact values of ex(n, \Kr+1, Ms+1\), where Kr+1 and Ms+1 are complete graph on r + 1 vertices and matching of size s + 1, respectively. Ma and Hou (arXiv2301.05625) gave the generalized version of Alon and Frankl's Theorem, which determine the exact values of ex(n, Kr, \Kk+1, Ms+1\). Zhang determined the exact values of ex(n, Kr, Ln, s), where Ln, s be the family of all linear forests of order n with s edges. Inspired by the work of Zhang and Ma, in this paper, we determined the exact number of ex(n, \Kr+1, Ln, s\).