Normal radicals and normal classes of modules
Glasgow mathematical journal, Tome 30 (1988) no. 1, pp. 97-100

Voir la notice de l'article provenant de la source Cambridge University Press

The study of special radicals was begun by Andrunakievič [1]. A class of prime rings is called special if it is hereditary and closed under prime extensions. The upper radicals determined by special classes are called special. In later works Andrunakievič and Rjabuhin [2] and [3] defined the concept of a special class of modules.
Nicholson, W. K.; Watters, J. F. Normal radicals and normal classes of modules. Glasgow mathematical journal, Tome 30 (1988) no. 1, pp. 97-100. doi: 10.1017/S0017089500007060
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[1] 1.Andrunakievič, V. A., Radicals of associative rings. II. Examples of special radicals, Mat. Sb. (N.S.) 55 (97) (1961), 329–346; Amer. Math. Soc. Transl. (2) 52 (1966), 129–150. Google Scholar

[2] 2.Andrunakievič, V. A. and Rjabuhin, Ju. M., Special modules and special radicals, Dokl. Akad. Nauk SSSR 147 (1962), 1274–1277. Google Scholar

[3] 3.Andrunakievič, V. A. and Rjabuhin, Ju. M., Special modules and special radicals, In Memoriam: N. G. Čebotarev, 7–17, Izdat. Kazan. Univ., Kazan, 1964. Google Scholar

[4] 4.Desale, G. and Nicholson, W. K., Endoprimitive rings, J. Algebra 70 (1981), 548–560. Google Scholar | DOI

[5] 5.Nicholson, W. K. and Watters, J. F., Normal radicals and normal classes of rings, J. Algebra 59 (1979), 5–15. Google Scholar | DOI

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