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Main Authors: Auinger, K., Bitterlich, J., Otto, M.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2507.11685
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author Auinger, K.
Bitterlich, J.
Otto, M.
author_facet Auinger, K.
Bitterlich, J.
Otto, M.
contents Relations and interactions between the theorems of Ash, Herwig--Lascar and Ribes--Zalesskii are discussed and it is shown that these three theorems are equivalent in the sense that each of them can be derived from each other one. Some strengthenings of these theorems are obtained with the use of groups provided by a construction of the third author. Evidence is given that these strengthenings are substantially stronger than the classical results. Yet, it turns out that both kinds of results can be interpreted as different instances of the same common scheme, namely as \emph{finite approximation of free groups}.
format Preprint
id arxiv_https___arxiv_org_abs_2507_11685
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Finite approximation of free groups II: the Theorems of Ash, Herwig-Lascar and Ribes-Zalesskii -- revisited and strengthened
Auinger, K.
Bitterlich, J.
Otto, M.
Group Theory
Combinatorics
Logic
20M18, 03C52, 05C25, 05E18, 20B25
Relations and interactions between the theorems of Ash, Herwig--Lascar and Ribes--Zalesskii are discussed and it is shown that these three theorems are equivalent in the sense that each of them can be derived from each other one. Some strengthenings of these theorems are obtained with the use of groups provided by a construction of the third author. Evidence is given that these strengthenings are substantially stronger than the classical results. Yet, it turns out that both kinds of results can be interpreted as different instances of the same common scheme, namely as \emph{finite approximation of free groups}.
title Finite approximation of free groups II: the Theorems of Ash, Herwig-Lascar and Ribes-Zalesskii -- revisited and strengthened
topic Group Theory
Combinatorics
Logic
20M18, 03C52, 05C25, 05E18, 20B25
url https://arxiv.org/abs/2507.11685