Combining extensions of the Hales-Jewett\\ Theorem with Ramsey Theory\\ in other structures

Abstract

The Hales-Jewett Theorem states that given any finite nonempty set and any finite coloring of the free semigroup S over the alphabet there is a variable word\/ over all of whose instances are the same color. This theorem has some extensions involving several distinct variables occurring in the variable word. We show that, when combined with a sufficiently well behaved homomorphism, the relevant variable word simultaneously satisfies a Ramsey-Theoretic conclusion in the other structure. As an example we show that if τ is the homomorphism from the set of variable words into the natural numbers which associates to each variable word w the number of occurrences of the variable in w, then given any finite coloring of S and any infinite sequence of natural numbers, there is a variable word w whose instances are monochromatic and τ(w) is a sum of distinct members of the given sequence. Our methods rely on the algebraic structure of the Stone- Cech compactification of S and the other semigroups that we consider. We show for example that if τ is as in the paragraph above, there is a compact subsemigroup P of β which contains all of the idempotents of β such that, given any p∈ P, any A∈ p, and any finite coloring of S, there is a variable word w whose instances are monochromatic and τ(w)∈ A. We end with a new short algebraic proof of an infinitary extension of the Graham-Rothschild Parameter Sets Theorem.