Some remarks on Folkman graphs for triangles

Abstract

Folkman's theorem asserts the existence of graphs G which are K4-free, but which have the property that every two-coloring of E(G) contains a monochromatic triangle. The quantitative aspects of f(2,3,4), the least n such that there exists an n-vertex graph with both properties above, are notoriously difficult; a series of improvements over the span of two decades witnessed the solution to two \100 Erdős problems, and the current record due to Lange, Radziszowski, and Xu now stands at f(2,3,4) ≤ 786,with another \100 problem of Graham asking for a proof that f(2,3,4) < 100. In this paper, we study Folkman-like properties of a sequence Hq of finite geometric graphs constructed using Hermitian unitals in projective planes and present some evidence that the graph H3, which has 63 vertices, might contain a Folkman graph as a proper subgraph. More precisely, we first prove that for all prime powers q ≥ 3, there exists a system Tq of triangles in Hq such that no four span a K4 in Hq, but every two-coloring of E(Hq) induces a monochromatic triangle in Tq. We then show that a certain random alteration of Hq which destroys all of its K4's will, for large q, maintain the Ramsey property with high probability.