Schreier’s formula for prosupersolvable groups
From MaRDI portal
Publication:2973339
DOI10.1142/S0218196717500035zbMath1358.20021arXiv1609.02680MaRDI QIDQ2973339
Publication date: 3 April 2017
Published in: International Journal of Algebra and Computation (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1609.02680
Subgroup theorems; subgroup growth (20E07) Generalizations of solvable and nilpotent groups (20F19) Free nonabelian groups (20E05) Limits, profinite groups (20E18)
Related Items (1)
Cites Work
- Unnamed Item
- Ascending chains of finitely generated subgroups
- A characterisation of large finitely presented groups.
- The rank gradient from a combinatorial viewpoint.
- Rank gradient, cost of groups and the rank versus Heegaard genus problem
- Some applications of the first cohomology group
- The structure of free prosupersolvable groups
- On a new characterization of Demuskin groups
- Diamond theorem for a finitely generated free profinite group.
- Subgroups of free profinite groups and large subfields of Q
- Combinatorial group theory for pro-p groups
- On prosupersolvable groups
- Expanders, rank and graphs of groups
- Rank gradient in co-final towers of certain Kleinian groups
- Rank gradient and cost of Artin groups and their relatives.
- Varieties of finite supersolvable groups with the M.~Hall property.
- Über modulare Darstellungen endlicher Gruppen, die von freien Gruppen induziert werden
- Free subgroups of finitely generated free profinite groups
- Ranks of subgroups in boundedly generated groups
- A -group with positive rank gradient
- Rank gradient and torsion groups
- Field Arithmetic
- NORMAL SUBGROUPS OF FREE PROFINITE GROUPS
- Random normal subgroups of free profinite groups
- Free subgroups of free profinite groups
- Groups with positive rank gradient and their actions
- Hilbertian Fields and Free Profinite Groups
- Subgroups and homology of extensions of centralizers of pro-pgroups
- A Karrass–Solitar theorem for profinite groups
- Profinite Groups
This page was built for publication: Schreier’s formula for prosupersolvable groups
