On weakly (m,n)-closed δ-primary ideals of commutative rings

Abstract

Let R be a commutative ring with 1≠0. In this article, we introduce the concept of weakly (m,n)-closed δ-primary ideals of R and explore its basic properties. We show that IfJ is a weakly (m,n)-closed δf-primary ideal of AfJ that is not (m,n)-closed δf-primary if and only if I is a weakly (m,n)-closed δ-primary ideal of A that is not (m,n)-closed δ-primary and for every δ-(m,n)-unbreakable-zero element a of I we have (f(a)+j)m=0 for every j∈~J, where f:A→ B is a homomorphism of rings and J is an ideal of B. Furthermore, we provide examples to demonstrate the validity and applicability of our results.

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