On the weak and strong Lefschetz properties for initial ideals of determinantal ideals with respect to diagonal monomial orders

Abstract

We study the weak and strong Lefschetz properties for R/in(It), where It is the ideal of a polynomial ring R generated by the t-minors of an m× n matrix of indeterminates, and in(It) denotes the initial ideal of It with respect to a diagonal monomial order. We show that when It is generated by maximal minors (that is, t=min\m,n\), the ring R/in(It) has the strong Lefschetz property for all m, n. In contrast, for t<min\m,n\, we provide a bound such that R/in(It) fails to satisfy the weak Lefschetz property whenever the product mn exceeds this bound. As an application, we present counterexamples that provide a negative answer to a question posed by Murai regarding the preservation of Lefschetz properties under square-free Gr\"obner degenerations.