The Classification of Homogeneous Simple 3-graphs

Abstract

We classify the ultrahomogeneous complete 3-edge-coloured graphs (3-graphs) with simple theory. This extends Lachlan's result (a corollary of the Effective Classification Theorem for stable structures) classifying the stable homogeneous 3-graphs. The unstable structures in this class are: + Primitive structures: The random 3-graph i,j,k + Imprimitive structures with infinite classes: * Kmi[j,k], m∈ω+1 * i,j[Kωk] * Bni,j, n∈ω, n≥2 * Bi + Imprimitive structures with finite classes: * Ci(j,k) * i,j[Knk], n∈ω Where \i,j,k\=\R,S,T\, Bni,j is the random n-partite graph, and B is the Fra\"iss\'e limit of the class of all finite 3-graphs in which the predicate i is an equivalence relation (i.e., the triangles iij and iik are forbidden). Finally, Ci(j,k) is the 3-graph obtained from the following construction: enumerate the Random Graph in predicates j,k as \vn:n∈ω\. For each vertex vn, there are two vertices, an and bn in Ci(j,k) which are i-related. There are no more i-edges, and if j(vn,vm) holds, declare j(an,am) j(bn,bm). All other edges are of type k.