On Existentially Complete Triangle-free Graphs

Abstract

For a positive integer k, we say that a graph is k-existentially complete if for every 0 ≤ a ≤ k, and every tuple of distinct vertices x1,…,xa, y1,…,yk-a, there exists a vertex z that is joined to all of the vertices x1,…,xa and none of the vertices y1,…,yk-a. While it is easy to show that the binomial random graph Gn,1/2 satisfies this property with high probability for k c n, little is known about the "triangle-free" version of this problem; does there exist a finite triangle-free graph G with a similar "extension property". This question was first raised by Cherlin in 1993 and remains open even in the case k=4. We show that there are no k-existentially complete triangle-free graphs with k >8 n n, thus giving the first non-trivial, non-existence result on this "old chestnut" of Cherlin. We believe that this result breaks through a natural barrier in our understanding of the problem.