CLASSES DE STEINITZ D'EXTENSIONS NON ABÉLIENNES À GROUPE DE GALOIS D'ORDRE 16 OU EXTRASPÉCIAL D'ORDRE 32 ET PROBLÈME DE PLONGEMENT
From MaRDI portal
Publication:3074571
DOI10.1142/S1793042110003794zbMath1215.11110OpenAlexW2008495469MaRDI QIDQ3074571
Farah Sbeity, Bouchaïb Sodaïgui
Publication date: 9 February 2011
Published in: International Journal of Number Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s1793042110003794
Related Items
On Steinitz classes, realizable Galois module classes and embedding problems for non-abelian extensions of degree a power of 2 ⋮ Steinitz classes of Galois extensions with Galois group having nontrivial center
Cites Work
- Unnamed Item
- Unnamed Item
- On realizable Galois module classes and Steinitz classes of nonabelian extensions
- ``Galois module structure of quaternion extensions of degree 8
- Galois module structure for dihedral extensions of degree 8: realizable classes over the group ring
- Relative Galois module structure and Steinitz classes of dihedral extensions of degree 8
- Realizable classes of quaternion extensions of degree \(4\ell\)
- Relative Galois module structure of octahedral extensions
- Extra-Special Groups of Order 32 as Galois Groups
- Realizable Galois module classes for tetrahedral extensions
- Automatic realizability of Galois groups of order 16
- On 2-Groups as Galois Groups
- Advanced Topics in Computional Number Theory
- Classes de Steinitz d'extensions quaternioniennes généralisées de degré 4p r
- The discriminants of relative extensions and the existence of integral bases
This page was built for publication: CLASSES DE STEINITZ D'EXTENSIONS NON ABÉLIENNES À GROUPE DE GALOIS D'ORDRE 16 OU EXTRASPÉCIAL D'ORDRE 32 ET PROBLÈME DE PLONGEMENT
