Structural Analysis of Commutative S-Reduced Rings
Abstract
Let R be a commutative ring with identity, S ⊂eq R be a multiplicative set. In this paper, we establish that the intersection of all S-prime ideals in an S-reduced ring is S-zero. Also, we show that an S-Artinian reduced ring is isomorphic to the finite direct product of fields. Furthermore, we provide an example of an S-reduced ring which is a uniformly-S-Armendariz ring (in short, u-S-Armendariz) ring. Additionally, we prove that the class of uniformly-S-reduced rings (in short, u-S-reduced rings) belongs to the class of u-S-Armendariz rings. Among other results, we establish the relationship between S-reduced rings and S-strongly Hopfian rings. Finally, we prove the structure theorem for S-reduced rings.
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