Spectral supersaturation for color-critical graphs
Abstract
A graph is color-critical if it contains an edge whose deletion reduces its chromatic number. This class of graphs, including cliques and odd cycles, plays a central role in extremal graph theory. In this paper, following an influential line of research initiated by Bollob\'as-Nikiforov, we study the spectral supersaturation problem for color-critical graphs. Let Tn,r be the r-partite Tur\'an graph, let Tn,r,q denote the family of graphs obtained from Tn,r by adding q edges, and let λ(G) be the spectral radius of a graph G. We first prove that for any color-critical graph F with chromatic number r+1, there exists δF > 0 such that for sufficiently large n and all 1 ≤ q ≤ δF n, any n-vertex graph G with λ(G) T ∈ Tn,r,q λ(T) contains at least q · c(n,F) copies of F, where c(n,F) denotes the minimum number of copies of F created by adding a single edge to Tn,r; moreover, any extremal graph G must belong to Tn,r,q.Next, we prove a spectral supersaturation result for the analogous condition λ(G) T ∈ Tn,r,q λ(T), valid for all 1 ≤ q ≤ δF n. Together, these results provide a complete resolution to a problem proposed by Ning-Zhai, and establish a spectral counterpart to the well-known results of Mubayi and Pikhurko-Yilma in the extremal supersaturation setting. A notable feature of our first result is that the restriction q = O(n) is tight up to a constant factor, in contrast to the linear bounds provided by other settings discussed above. As applications, we extend a result of Liu-Mubayi, and solve a related conjecture by Li-Lu-Peng.
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