Complete type amalgamation for non-standard finite groups
Logic
2024-05-01 v5 Combinatorics
Abstract
We extend previous work on Hrushovski's stabilizer's theorem and prove a measure-theoretic version of a well-known result of Pillay-Scanlon-Wagner on products of three types. This generalizes results of Gowers on products of three sets and yields model-theoretic proofs of existing asymptotic results for quasirandom groups. We also obtain a model-theoretic proof of Roth's theorem on the existence of arithmetic progressions of length for subsets of positive density in suitable definably amenable groups, such as countable amenable abelian groups without involutions and ultraproducts of finite abelian groups of odd order.
Keywords
Cite
@article{arxiv.2009.08967,
title = {Complete type amalgamation for non-standard finite groups},
author = {Amador Martin-Pizarro and Daniel Palacín},
journal= {arXiv preprint arXiv:2009.08967},
year = {2024}
}