Monotone Paths in Dense Edge-Ordered Graphs
Abstract
The altitude of a graph G, denoted f(G), is the largest integer k such that under each ordering of E(G), there exists a path of length k which traverses edges in increasing order. In 1971, Chv\'atal and Koml\'os asked for f(Kn), where Kn is the complete graph on n vertices. In 1973, Graham and Kleitman proved that f(Kn) n - 3/4 - 1/2 and in 1984, Calderbank, Chung, and Sturtevant proved that f(Kn) (12 + o(1))n. We show that f(Kn) (120 - o(1))(n/ n)2/3.
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