Bulletin Canadien de Mathématiques
Proof. Since the right ideals are principal they are dually well ordered by inclusion (aR U bR=aR or bR), we can write by 3.1, xS c eaS c yS c efiS. ... Then tf=/f W e^S is a right ideal of S. For if zee^S, then zSc^Saquot;. \i hsH and seefS, /3agt;a then /ij ganbsp;...
| Title | : | Bulletin Canadien de Mathématiques |
| Author | : | |
| Publisher | : | - 1974 |
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