Fields definable in the free group
DOI10.1090/btran/41zbMath1500.03011arXiv1512.07922OpenAlexW2985168259WikidataQ126809024 ScholiaQ126809024MaRDI QIDQ5243155
Rizos Sklinos, Ayala Dente Byron
Publication date: 15 November 2019
Published in: Transactions of the American Mathematical Society, Series B (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1512.07922
Model-theoretic algebra (03C60) Free nonabelian groups (20E05) Word problems, other decision problems, connections with logic and automata (group-theoretic aspects) (20F10) Classification theory, stability, and related concepts in model theory (03C45) Cancellation theory of groups; application of van Kampen diagrams (20F06)
Related Items (1)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Forking and JSJ decompositions in the free group
- Elementary theory of free non-abelian groups.
- Degenerations of the hyperbolic space
- Topologie de Gromov équivariante, structures hyperboliques et arbres réels. (Equivariant Gromov topology, hyperbolic structures, and \({\mathbb{R}}\)-trees)
- Irreducible affine varieties over a free group. I: Irreducibility of quadratic equations and Nullstellensatz
- The free group does not have the finite cover property
- Diophantine geometry over groups. II: Completions, closures and formal solutions
- Diophantine geometry over groups. I: Makanin-Razborov diagrams
- Diophantine geometry over groups. III: Rigid and solid solutions.
- Implicit function theorem over free groups.
- Actions of finitely generated groups on \(\mathbb{R}\)-trees.
- Notes on Sela's work: Limit groups and Makanin-Razborov diagrams
- On the generic type of the free group
- On groups and fields interpretable in torsion-free hyperbolic groups
- DEFINABLE SETS IN A HYPERBOLIC GROUP
- A note on CM-triviality and the geometry of forking
- Some remarks on one-basedness
- Diophantine geometry over groups VII: The elementary theory of a hyperbolic group
- FORKING IN THE FREE GROUP
This page was built for publication: Fields definable in the free group
