Decomposability and embeddability of discretely Henselian division algebras
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Publication:677451
DOI10.1007/BF02785537zbMath0886.16015MaRDI QIDQ677451
Publication date: 10 May 1998
Published in: Israel Journal of Mathematics (Search for Journal in Brave)
indexdivision algebrasdecomposabilityperioddecomposable Sylow factorsdivision algebras of odd indexindecomposable \(k(t)\)-division algebrasindecomposable division subalgebrassemiramified division subalgebrastotally ramified subfields
Arithmetic theory of algebraic function fields (11R58) Finite-dimensional division rings (16K20) Skew fields, division rings (12E15)
Related Items
Division algebra subfields introduced by an indeterminate, Indecomposability and cyclicity in the p-primary part of the Brauer group of a p-adic curve, Indecomposable and noncrossed product division algebras over function fields of smooth \(p\)-adic curves., Formal constructions in the Brauer group of the function field of a 𝑝-adic curve
Cites Work
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- Division algebras over Henselian fields.
- Indecomposable algebras of prime exponent.
- Cyclic division algebras
- PI-algebras. An introduction
- Crossed products over algebraic function fields
- Division algebra subfields introduced by an indeterminate
- Crossed products over rational function fields
- Indecomposible division algebras of prime exponent.
- Indecomposable Division Algebras
- The Index of a Brauer Class on a Brauer-Severi Variety
- Indecomposable division algebras
- Normal Division Algebras of Degree Four Over an Algebraic Field
- Noncrossed Products and Nonabelian Crossed Products Over ℚ(T) and ℚ((T))
- ℚ(t) and ℚ((t))-Admissibility of Groups of Odd Order
- Division algebras of degree 4 and 8 with involution
