On S-prime and S-primary elements in multiplicative lattices

Abstract

In this paper, we study S-prime elements and S-primary elements within the framework of multiplicative lattices. Furthermore, we define and explore weakly S-prime elements and weakly S-primary elements, which generalize weakly prime elements and weakly primary elements in multiplicative lattices respectively. We show that the weakly S-prime ideals (weakly S-primary ideals) of a commutative ring R with 1 correspond precisely to the weakly SL-prime elements (weakly S-primary elements) of the ideal lattice Id(R) of R, where SL = \(s) s ∈ S\.