An edge-spectral Erdos-Stone-Simonovits theorem and its stability

Abstract

We study the extremal problem that relates the spectral radius λ (G) of an F-free graph G with its number of edges. Firstly, we prove that for any graph F with chromatic number (F)=r+1 3, if G is an F-free graph on m edges, then λ2(G) (1-1r + o(1))2m. This provides a unified extension of both the Erdos--Stone--Simonovits theorem and its vertex-spectral version due to Nikiforov, and confirms a conjecture proposed by Li, Liu and Feng. We also establish the corresponding edge-spectral stability, showing that if G is an F-free graph on m edges with λ2(G)=(1- 1r - o(1))2m, then G differs from a complete bipartite graph by o(m) edges when r=2, and G differs from an r-partite Tur\'an graph by o(m) edges when r 3. This extends the classical Erdos--Simonovits stability theorem. As an application of our method, we improve a result of Zhai, Lin and Shu by showing that if λ (G)>m, then there exist two vertices in G that have at least 12m - O(1) common neighbors. This bound is the best possible as witnessed by a random construction.