Abstract
AbstractStarting with a class ℳ of Ω-groups, necessary and sufficient conditions on ℳ are given to ensure that the corresponding Hoehnke radical ρ (determined by the subdirect closure of ℳ as semisimple class) is a radical in the sense of Kurosh and Amitsur; has a hereditary semisimple class; satisfies the ADS-property; has a hereditary radical class or satisfies ρN ∩ I ⊆ ρI and lastly, have both a hereditary radical and semisimple class or satisfies ρN ∩ I = ρI.
Publisher
Cambridge University Press (CUP)
Subject
General Mathematics,Statistics and Probability
Reference23 articles.
1. Supernilpotent radicals of near-rings
2. Lower radical properties for alternative rings;Krempa;Bull. Acad. Polon. Sci. Sér. Sci. Math.,1975
3. Radicals of associative rings, I;Andrunakievič;Mat Sb.,1958
4. Radicals and subdirect decomposition
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