On Some Properties of LCM-Lattices of Edge Ideals of k-Uniform Hypergraphs

Abstract

In this article, we investigate the combinatorial and algebraic properties of the lcm-lattice associated with the edge ideal of a hypergraph. Let be a hypergraph, I() its corresponding edge ideal in a polynomial ring in n variables, and Icm(I()) the associated lcm-lattice. We establish conditions under which the lcm-lattice of an edge ideal is Boolean, modular, or complemented. Furthermore, we extend these results to the case of the product of lcm-lattices in the complemented case. Additionally, we study the effects of polarization on the lcm-lattices of I() and its polarized ideal.