Vertex-Based Localization of Tur\'an's Theorem

Abstract

Let G be a simple graph with n vertices and m edges. According to Tur\'an's theorem, if G is Kr+1-free, then m ≤ |E(T(n, r))|, where T(n, r) denotes the Tur\'an graph on n vertices with a maximum clique of order r. A limitation of this statement is that it does not give an expression in terms of n and r. A widely used version of Tur\'an's theorem states that for an n-vertex Kr+1-free graph, m ≤ n2(r-1)2r . Though this bound is often more convenient, it is not the same as the original statement. In particular, the class of extremal graphs for this bound, say S, is a proper subset of the set of Tur\'an graphs. In this paper, we generalize this result as follows: For each v ∈ V(G), let c(v) be the order of the largest clique that contains v. We show that \[ m ≤ n2Σv∈ V(G)c(v)-1c(v)\] Furthermore, we characterize the class of extremal graphs that attain equality in this bound. Interestingly, this class contains two extra non-Tur\'an graphs other than the graphs in S.

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