On maximal nilpotent subrings of right Noetherian rings
Glasgow mathematical journal, Tome 8 (1967) no. 2, pp. 89-101

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Applying Hopkins's Theorem asserting that each unitary right Artinian ring is right Noetherian, G. Köthe and K. Shoda proved the following theorem (cf. Köthe [7], p. 360, Theorem 1 and p. 363, Theorem 5): If R is a unitary right Artinian ring, then the following statements hold:(i) Each nilpotent subring of R is contained in a maximal nilpotent subring of R.(ii) The intersection of all maximal nilpotent subrings of R is the maximal nilpotent twosided ideal of R.(iii) All maximal nilpotent subrings of R are conjugate.
Michler, Gerhard. On maximal nilpotent subrings of right Noetherian rings. Glasgow mathematical journal, Tome 8 (1967) no. 2, pp. 89-101. doi: 10.1017/S0017089500000148
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