On the Lefschetz Property for quotients by monomial ideals containing squares of variables

Abstract

Let be an (abstract) simplicial complex on n vertices. One can define the Artinian monomial algebra A() = [x1, …, xn]/ x12, …, xn2, I , where is a field of characteristic 0 and I is the Stanley-Reisner ideal associated to . In this paper, we aim to characterize the Weak Lefschetz Property (WLP) of A() in terms of the simplicial complex . We are able to completely analyze when WLP holds in degree 1, complementing work by Migliore, Nagel and Schenck in [MNS2020]. We give a complete characterization of all 2-dimensional pseudomanifolds such that A() satisfies WLP. We also construct Artinian Gorenstein algebras that fail WLP by combining our results and the standard technique of Nagata idealization.

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