On S-Integral Domains and S-Version of Krull Intersection Theorem

Abstract

Let S⊂eq R be a multiplicatively closed subset of a ring R. We extend several results on integral domains to their S-versions and establish the S-version of Krull intersection theorem. We also show that if R is an S-field, then the localization of R with respect to S is a φ(S)-field, where φ(S)= \s1| \ s∈ S \ is a multiplicatively closed subset of S-1R, and prove the converse under the condition of finiteness of S. As a consequence, we show that every finite S-integral domain is an S-field. Also, we provide several examples to illustrate the significance of our findings.

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