A spectral Lov\'asz-Simonovits theorem

Abstract

A fundamental result in extremal graph theory is attributed to Mantel's theorem, which states that every graph on n vertices with more than n2/4 edges must contain a triangle. Lov\'asz and Simonovits (1975) provided a supersaturation phenomenon by showing that for any q< n/2, every graph with n2/4 +q edges contains at least q n/2 triangles. This result resolved a conjecture proposed by Erdos in 1962. In this paper, we establish a spectral counterpart of the result of Lov\'asz and Simonovits. Let Yn,2,q be the graph obtained from the bipartite Tur\'an graph Tn,2 by embedding a matching with q edges into the partite set of size n/2. Using the supersaturation-stability method and the spectral techniques, we firstly prove that for q 111n, every graph G on n vertices with spectral radius λ (G) λ (Yn,2,q) contains at least q n/2 triangles. We also show that the bound q=O(n) is tight up to a constant factor, yielding a phenomenon different from that in edge supersaturation. Our result answers a spectral triangle counting problem proposed by Ning and Zhai (2023). Secondly, let Tn,2,q be the graph obtained from Tn,2 by embedding a star with q edges into the partite set of size n/2. We show further that Tn,2,q is the unique extremal graph that contains at most q n/2 triangles and attains the maximum spectral radius. Thirdly, we present an asymptotic spectral stability result under a specific constraint on the triangle covering number. This result could be viewed as a spectral extension of a recent result proved by Balogh and Clemen (2023), and independently by Liu and Mubayi (2022).