On S-Noetherian Lattices
Abstract
In this paper, we define and study S-Noetherian lattices as a natural generalization of Noetherian rings. We prove that a ring R is S-Noetherian if and only if its ideal lattice, Id(R), is SL-Noetherian. Furthermore, we establish a Cohen-Kaplansky type theorem for S-Noetherian lattices, showing that L is S-Noetherian if and only if every S-prime element of L is S-compact. Finally, we introduce the concept of S-primary elements-a generalization of primary elements in multiplicative lattices and demonstrate the existence and uniqueness of S-primary decomposition in S-Noetherian lattices.
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