Topological rings satisfying compactness conditions

by Mihail Ursul

The main aim of this text is to introduce the beginner to the theory of topological rings. Whilst covering all the essential theory of topological groups, the text focuses on locally compact, compact, linearly compact, hereditarily linear compact and bounded topological rings. The text also contains new, unpublished results on topological rings, for example the nilideals of topological rings, trivial extensions of special type, rings with a unique compact topology, compact right topological rings and the results from groups of units of topological rings.

「Nielsen BookData」より

[目次]

  • Introduction. Notation. 1. Elements of topological groups. 1. The definition of a topological group. 2. Neighborhoods of elements of a topological group. 3. Subgroups of a topological group. 4. Morphisms and quotients of topological groups. 5. The axioms of separation in topological groups. 6. Initial topologies. Products of topological groups. 7. The co-product topology on the algebraic direct. 8. Semi-direct products of topological groups. 9. The embedding of totally bounded groups in pseudo-compact ones. 10. Metrization of topological groups. 11. The connected component of a topological group. 12. Quasi-components of topological groups. 13. Complete topological groups. 14. Minimal topological groups. 15. Free topological groups. 16. The finest precompact topology on an Abelian group. 17. Ordered topological groups. 18. Topological groups of the second category. 19. Inverse limits of topological groups. 2. Topological rings. 1. The notion of a topological ring. 2. Neighborhoods of zero of a topological ring. 3. Subrings of topological rings. 4. Compact right topological rings. 5. The local structure of locally compact rings. 6. Structure of compact rings. 7. The separated completion of a topological ring. 8. Trivial extensions. 9. Ni1 and nilpotence in the class of locally compact rings. 10. The Wedderburn-Mal'cev theorem for compact rings. 11. Topological products of primary compact rings. 12. Zero divisors in topological rings. 13. The group of units of a topological ring. 14. Boundedness in locally compact rings. 15. Simple topological rings. 16. Homological dimension of a compact ring. 17. Local direct sums of locally compact rings. 18. Radicals in the class of locally compact rings. 19. Endc(RM). 20. Locally compact division rings. 21. Non-metrizable compact domains. 22. Open subrings of topological division. 23. Tensor products of compact rings. 24. Pseudo-compact topolo on the ring of polynomials. 25. The Lefschetz duality. 26. The uniqueness of compact ring topologies. 27. Totally bounded topological rings. 28. Representations of locally compact rings. 29. Open questions in topological groups and rings. Bibliography. Index.

「Nielsen BookData」より

この本の情報

書名 Topological rings satisfying compactness conditions
著作者等 Ursul Mihail
Ursul M. I. (Mikhail Ivanovich)
シリーズ名 Mathematics and its applications
出版元 Kluwer Academic
刊行年月 c2002
ページ数 ix, 327 p.
大きさ 25 cm
ISBN 1402009399
NCID BA60713946
※クリックでCiNii Booksを表示
言語 英語
出版国 オランダ
この本を: 
このエントリーをはてなブックマークに追加

このページを印刷

外部サイトで検索

この本と繋がる本を検索

ウィキペディアから連想