Original Articles

NILPOTENCY, SOLVABILITY AND RADICALS IN CATEGORIES

Published in: Quaestiones Mathematicae
Volume 14 , issue 2 , 1991 , pages: 129–136

DOI: 10.1080/16073606.1991.9631632

Author(s): S.G. Botha Department of Mathematics, Applied Mathematics and Astronomy, Republic of South Africa , A. Buys Department of Mathematics, Republic of South Africa

Keywords: Primary 18D35 , Secondary 16A21 , 17B30 , 20F14 , 20F16 , 20F18

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Abstract

Nilpotent and solvable ideals are defined and investigated in categories. The relation between the prime radical and the sum of the solvable ideals (which is also a radical) is discussed in categories. For example: If an object satisfies the maximal condition for ideals, then the prime radical is equal to the sum of the solvable ideals. Certain generalizations of theorems in rings, groups, Lie algebras, etc. are also proven, for example: An ideal α: I → A is semiprime if and only if A/I contains no non-zero nilpotent ideals.

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