Homogeneous Dual Ramsey Theorem

Abstract

For positive integers k < n such that k divides n, let (n)k be the set of homogeneous k-partitions of \1, …, n\, that is, the set of partitions of \1, …, n\ into k classes of the same cardinality. In the article "Ramsey properties of infinite measure algebras and topological dynamics of the group of measure preserving automorphisms: some results and an open problem" by Kechris, Sokic, and Todorcevic, the following question was asked: Is it true that given positive integers k < m and N such that k divides m, there exists a number n>m such that m divides n, satisfying that for every coloring (n)k=C1… CN we can choose u∈ (n)m such that \t∈ (n)k: t is coarser than u\⊂eq Ci for some i? In this note we give a positive answer to that question. This result turns out to be a homogeneous version of the finite Dual Ramsey Theorem of Graham-Rothschild. As explained by Kechris, Sokic, and Todorcevic in their article, our result also proves that the class OMBA Q2 of naturally ordered finite measure algebras with measure taking values in the dyadic rationals has the Ramsey property.