Abstract
The aim of this paper is to discuss some relations among hereditary, strong and stable radicals. In particular we investigate hereditariness of lower strong and stable radicals. Some facts obtained are related to some results and questions of [2, 6, 7].All rings in the paper are associative. Fundamental definitions and properties of radicals may be found in [9]. Definitions of hereditary and strong radicals are used as in Sands [7]. We say that a radical S is left (right) stable if(ρ): for every ring R and every left (right) ideal I of R it follows S(I)⊆S(R).
Publisher
Cambridge University Press (CUP)
Cited by
12 articles.
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1. RADICALS WITH THE α-AMITSUR PROPERTY;Journal of Algebra and Its Applications;2008-06
2. On coatoms of the lattice of matric-extensible radicals;Bulletin of the Australian Mathematical Society;2005-12
3. On Matrix Rings and Subhereditary Radicals;Communications in Algebra;2004-12-31
4. Rings which are sums of two subrings;Journal of Pure and Applied Algebra;1998-12
5. The singular ideal and radicals;Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics;1998-04