TY - JOUR ID - 164475 TI - On φ-δ-S-primary ideals of commutative rings JO - Khayyam Journal of Mathematics JA - KJM LA - en SN - AU - Jaber, Ameer AD - Department of Mathematics, Faculty of Science, The Hashemite University, Zarqa, Jordan Y1 - 2023 PY - 2023 VL - 9 IS - 1 SP - 61 EP - 80 KW - Prime ideal KW - $S$-Prime ideal KW - $\delta$-Primary ideal KW - $\phi$-$\delta$-Primary ideal DO - 10.22034/kjm.2022.350492.2590 N2 - Let $R$ be a commutative ring with unity $(1\not=0)$ and let $\mathfrak{J}(R)$ be the set of all ideals of $R$. Let $\phi:\mathfrak{J}(R)\rightarrow\mathfrak{J}(R)\cup\{\emptyset\}$ be a reduction function of ideals of $R$ and let $\delta:\mathfrak{J}(R)\rightarrow\mathfrak{J}(R)$ be an expansion function of ideals of $R$. We recall that a proper ideal $I$ of $R$ is called a $\phi$-$\delta$-primary ideal of $R$ if whenever $a,b\in R$ and $ab\in I-\phi(I)$, then $a\in I$ or $b\in\delta(I)$. In this paper, we introduce a new class of ideals that is a generalization to the class of $\phi$-$\delta$-primary ideals. Let $S$ be a multiplicative subset of $R$ such that $1\in S$ and let $I$ be a proper ideal of $R$ with $S\cap I=\emptyset$, then $I$ is called a $\phi$-$\delta$-$S$-primary ideal of $R$ associated to $s\in S$ if whenever $a,b\in R$ and $ab\in I-\phi(I)$, then $sa\in I$ or $sb\in\delta(I)$. In this paper, we have presented a range of different examples, properties, characterizations of this new class of ideals. UR - https://www.kjm-math.org/article_164475.html L1 - https://www.kjm-math.org/article_164475_83ab3afc357fe0a0d40ed82f14555b97.pdf ER -