Sharp results for the Erdos, Pach, Pollack and Tuza problem

Abstract

We consider the Erdos, Pach, Pollack and Tuza problem, asking for the maximum diameter of a graph with given order n, minimum degree δ and clique number at most ω. We solve their problem asymptotically for the first hard case, ω ≤ 3, for the smallest values of δ by determining the smallest rational number f(δ) such that diam(G) ≤ f(δ)n+O(1) for all graphs G with order n, minimum degree δ and clique number ω ≤ 3. We also consider the weaker version where the clique number ω ≤ 3 is replaced by having chromatic number ≤ 3 and solve this version for small δ, thereby yielding a counterexample to a conjecture of Erdos et al. in a regime where this conjecture was still open. When restricting the conjecture to graphs with chromatic number ≤ 3, we show that this counterexample appears for the smallest possible δ, namely δ=16.

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