Spectral extrema of graphs with bounded clique number and matching number

Abstract

For a set of graphs F, let (n,F) and (n,F) denote the maximum number of edges and the maximum spectral radius of an n-vertex F-free graph, respectively. Nikiforov ( LAA, 2007) gave the spectral version of the Tur\'an Theorem by showing that (n, Kk+1)=λ (Tk(n)), where Tk(n) is the k-partite Tur\'an graph on n vertices. In the same year, Feng, Yu and Zhang ( LAA) determined the exact value of (n, Ms+1), where Ms+1 is a matching with s+1 edges. Recently, Alon and Frankl~(arXiv2210.15076) gave the exact value of (n,\Kk+1,Ms+1\). In this article, we give the spectral version of the result of Alon and Frankl by determining the exact value of (n,\Kk+1,Ms+1\) when n is large.