Article
Keywords:
group ring; s-weakly regular ring
Summary:
In this note we obtain a necessary and sufficient condition for a ring to be $s$-weakly regular (i) When $R$ is a ring with identity and without divisors of zero (ii) When $R$ is a ring without divisors of zero. Further it is proved in a $s$-weakly regular ring with identity and without units every element is a zero divisor.
References:
[1] Gupta, V.:
A generalization of strongly regular rings. Acta. Math. Hungar 43 (1984), No 1-2, 57-61.
MR 0731964 |
Zbl 0535.16015