Invariant ideals of abelian group algebras under the multiplicative action of a field. I

Invariant ideals of abelian group algebras under the multiplicative action of a field. I

Let D be a division ring and let V=D^n be a finite-dimensional D-vector space, viewed multiplicatively. If G=D^\bullet is the multiplicative group of D, then G acts on V and hence on any group algebra K[V]. Our goal is to completely describe the semiprime G-stable ideals of K[V]. As it turns out, th...

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Bibliographic Details
Published in:Proceedings of the American Mathematical Society Vol. 130; no. 4; pp. 939 - 949
Main Authors: Passman, D. S., Zalesskiǐ, A. E.
Format: Journal Article
Language:English
Published: Providence, RI American Mathematical Society 01-04-2002
Subjects:
Algebra
Associative rings and algebras
College mathematics
Exact sciences and technology
Field theory and polynomials
Mathematical induction
Mathematical rings
Mathematical theorems
Mathematics
Sciences and techniques of general use
Uniqueness
Written composition
Invariant
Group algebra
Vector space
Abelian group
Ideal (mathematics)
Group theory
Invariant ideal
Finite dimension
Division ring
Multiplicative action
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Summary:Let D be a division ring and let V=D^n be a finite-dimensional D-vector space, viewed multiplicatively. If G=D^\bullet is the multiplicative group of D, then G acts on V and hence on any group algebra K[V]. Our goal is to completely describe the semiprime G-stable ideals of K[V]. As it turns out, this result follows fairly easily from the corresponding results for the field of rational numbers (due to Brookes and Evans) and for infinite locally-finite fields. Part I of this work is concerned with the latter situation, while Part II deals with arbitrary division rings.
ISSN:0002-9939
1088-6826
DOI:10.1090/S0002-9939-01-06092-0