JOURNAL ARTICLE
Nicely semiramified division algebras over Henselian fields
Abstract
This paper deals with the structure of nicely semiramified valued division algebras. We prove that any defectless finite-dimensional central division algebra over a Henselian fieldEwith an inertial maximal subfield and a totally ramified maximal subfield (not necessarily of radical type) (resp., split by inertial and totally ramified field extensions ofE) is nicely semiramified.
Keywords:
Division (mathematics) Field (mathematics) Algebra over a field Division algebra Inertial frame of reference Division ring
Metrics
0
Cited By
0.00
FWCI (Field Weighted Citation Impact)
0
Refs
0.49
Citation Normalized Percentile
Is in top 1%
Is in top 10%
Topics
Rings, Modules, and Algebras
Physical Sciences → Mathematics → Algebra and Number Theory
Advanced Topics in Algebra
Physical Sciences → Mathematics → Algebra and Number Theory
Algebraic structures and combinatorial models
Physical Sciences → Mathematics → Geometry and Topology
Related Documents
JOURNAL ARTICLE
Nicely semiramified division algebras over Henselian fields
Journal: Greater South Information System Year: 2005
JOURNAL ARTICLE
Nicely semiramified division algebras over Henselian fields
Journal: International Journal of Mathematics and Mathematical Sciences Year: 2005 Vol: 2005 (4)Pages: 571-577
JOURNAL ARTICLE
Division algebras over Henselian fields
Journal: Journal of Algebra Year: 1990 Vol: 128 (1)Pages: 126-179
BOOK-CHAPTER
Division Algebras over Henselian Fields
Jean-Pierre TignolAdrian R. Wadsworth
Springer monographs in mathematics Year: 2015 Pages: 377-454
JOURNAL ARTICLE
Kummer subfields of tame division algebras over Henselian fields
Journal: Journal of Pure and Applied Algebra Year: 2009 Vol: 214 (4)Pages: 440-448