A path Turan problem for infinite graphs

Abstract

Let G be an infinite graph whose vertex set is the set of positive integers, and let Gn be the subgraph of G induced by the vertices \1,2, … , n \. An increasing path of length k in G, denoted Ik, is a sequence of k+1 vertices 1 ≤ i1 < i2 < … < ik+1 such that i1, i2, …, ik+1 is a path in G. For k ≥ 2, let p(k) be the supremum of n → ∞ e(Gn) n2 over all Ik-free graphs G. In 1962, Czipszer, Erdos, and Hajnal proved that p(k) = 14 (1 - 1k) for k ∈ \2,3 \. Erdos conjectured that this holds for all k ≥ 4. This was disproved for certain values of k by Dudek and R\"odl who showed that p(16) > 14 (1 - 116) and p(k) > 14 + 1200 for all k ≥ 162. Given that the conjecture of Erdos is true for k ∈ \2,3 \ but false for large k, it is natural to ask for the smallest value of k for which p(k) > 14 ( 1 - 1k ). In particular, the question of whether or not p(4) = 14 ( 1 - 14 ) was mentioned by Dudek and R\"odl as an open problem. We solve this problem by proving that p(4) ≥ 14 (1 - 14 ) + 1584064 and p(k) > 14 (1 - 1k) for 4 ≤ k ≤ 15. We also show that p(4) ≤ 14 which improves upon the previously best known upper bound on p(4). Therefore, p(4) must lie somewhere between 316 + 1584064 and 14