A Study of S-primary Ideals in Commutative Semirings

Abstract

In this article, we define the concept of an S-k-irreducible ideal and S-k-maximal ideal in a commutative semiring. We also establish several results concerning S-k-primary ideals and prove the existence theorem and the S-version of the uniqueness theorem using localization, for S-k-primary decompositions. Also we show that the S-radical of every S-primary ideal is a prime ideal of R. Moreover, we investigate the structure of S-primary ideals in principal ideal semidomain and prove that each such ideal can be expressed of the form, I = (vpn), n∈ N and for some p ∈ P - PS and v∈ R such that (v) S≠ , where P is the set of all irreducible (prime) elements of R and for a multiplicative subset S⊂neq R, the set PS defined by PS=\p∈ P : (p) S ≠ \.

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