On $S$-Noetherian Lattices
Commutative Algebra
2026-04-30 v1
Abstract
In this paper, we define and study -Noetherian lattices as a natural generalization of Noetherian rings. We prove that a ring is -Noetherian if and only if its ideal lattice, , is -Noetherian. Furthermore, we establish a Cohen-Kaplansky type theorem for -Noetherian lattices, showing that is -Noetherian if and only if every -prime element of is -compact. Finally, we introduce the concept of -primary elements-a generalization of primary elements in multiplicative lattices and demonstrate the existence and uniqueness of -primary decomposition in -Noetherian lattices.
Cite
@article{arxiv.2604.26058,
title = {On $S$-Noetherian Lattices},
author = {Sachin Sarode and Chetan Patil and Vinayak Joshi},
journal= {arXiv preprint arXiv:2604.26058},
year = {2026}
}