# Homogeneous Dual Ramsey Theorem

**Authors:** Jose G. Mijares

arXiv: 1907.02675 · 2019-07-16

## TL;DR

This paper proves a positive answer to a question about homogeneous partitions and colorings, extending the finite Dual Ramsey Theorem and establishing the Ramsey property for certain finite measure algebras.

## Contribution

It introduces a homogeneous version of the finite Dual Ramsey Theorem, resolving an open problem and linking it to measure algebra Ramsey properties.

## Key findings

- Confirmed the existence of homogeneous partitions satisfying coloring conditions
- Extended the finite Dual Ramsey Theorem to a homogeneous setting
- Proved the Ramsey property for finite measure algebras with dyadic rational measures

## Abstract

For positive integers $k < n$ such that $k$ divides $n$, let $(n)^k_{\hom}$ be the set of homogeneous $k$-partitions of $\{1, \dots, n\}$, that is, the set of partitions of $\{1, \dots, n\}$ 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 $(n)^k_{\hom}=C_1\cup\dots\cup C_N$ we can choose $u\in (n)^m_{\hom}$ such that $\{t\in (n)^k_{\hom}: t\mbox{ is coarser than } u\}\subseteq C_i$ 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 $\mathcal{OMBA}_{\mathbb Q_2}$ of naturally ordered finite measure algebras with measure taking values in the dyadic rationals has the Ramsey property.

## Full text

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## References

5 references — full list in the complete paper: https://tomesphere.com/paper/1907.02675/full.md

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Source: https://tomesphere.com/paper/1907.02675