Copies of the Random Graph

Abstract

Let (R, ) be the Rado graph, Emb (R) the monoid of its self-embeddings, (R)=\ f[R]: f∈ Emb (R)\ the set of copies of R contained in R, and IR the ideal of subsets of R which do not contain a copy of R. We consider the poset ( (R ), ⊂ ), the algebra P (R)/ I R, and the inverse of the right Green's pre-order on Emb (R), and show that these pre-orders are forcing equivalent to a two step iteration of the form P π, where the poset P is similar to the Sacks perfect set forcing: adds a generic real, has the 0-covering property and, hence, preserves ω 1, has the Sacks property and does not produce splitting reals, while π codes an ω-distributive forcing. Consequently, the Boolean completions of these four posets are isomorphic and the same holds for each countable graph containing a copy of the Rado graph.