Theory of radicals
Author(s)
Bibliographic Information
Theory of radicals
(Colloquia Mathematica Societatis János Bolyai, 61)
North-Holland, 1993
- : ne
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
C-P||Szekszárd||1991.793025816
Note
"In 1991 in Szekszárd" ... Pref
Description and Table of Contents
Description
Radicals arose originally from structural investigations in rings, but later on they infiltrated into various branches of algebra, as well as into topology and relational structure. This volume is the result of a conference attended by mathematicians from all five continents and thus aims to represent the current state of research in the area of radicals.
Table of Contents
- On essential extensions, maximal essential extensions and iterated maximal essential extensions in radical theory, K.I. Beidar
- a structure theorem for Omega-groups, A.Buys
- quasi-division rings - some examples of quasi-regular rings, H.L. Chick
- strong hereditary strict radicals and quotient categories of commutative rings, B.J. Gardner
- radicals in Abelian groups, R. Goebel
- radicals of graded rings, E. Jespers
- a general approach to the structure of radicals in some ring constructions, A.V. Kelarev
- closed ideals in non-unital Morita rings, S. Kyuno
- radical extensions, W.G. Leavitt
- the distributive radical, R. Mazurek
- radical ideals of radically simple rings and their extensions, N.R. McConnell and T. Stokes
- classes of strongly semiprime rings, D.M. Olson, H.J. Le Roux and G.A.P. Heyman
- some questions concerning radicals of associative rings, E.R. Puczylowski
- some remarks about modularity of lattices of radicals of associative rings, E. Roszkowska
- some subidempotent radicals, A.D. Sands
- the radical of locally compact alternative and Jordan rings, A.M. Slin'ko
- on non-hypersolvable radicals of not necessarily associative rings, S. Tumurbat
- to the abstract theory of radicals - a contribution from near-rings, S. Veldsman
- complementary radical classes of proper semifields, H.J. Weinert and R. Weigandt.
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