The Henson graphs: colorings and codings

Abstract

By recent work of DobrinenICM and Balko7 we know that every finite G in the Henson graph Hn+1 (the universal ultrahomogeneous (n+1)-clique free graph) has exact finite big Ramsey degree k(G,n). That is, there is a positive integer k(G,n) such that for each finite coloring C of the copies of G in Hn+1, there is H, a substructure of Hn+1 and isomorphic to Hn+1, such that in H at most k(G,n) colors are used on the copies of G in H. Moreover, for exactness, for some coloring and all corresponding H, all k(G,n) colors are needed. The ultimate result here is that if |G|≥ 2, then there is a finite computable coloring C such that, for all such H, we have that H computes (|G|-1) (and hence the halting set).