Gr\"obner bases, resolutions, and the Lefschetz properties for powers of a general linear form in the squarefree algebra

Abstract

For the almost complete intersection ideals (x12, …, xn2, (x1 + ·s + xn)k), we compute their reduced Gr\"obner basis for any term ordering, revealing a combinatorial structure linked to lattice paths, elementary symmetric polynomials, and Catalan numbers. Using this structure, we classify the weak Lefschetz property for these ideals. Additionally, we provide a new proof of the well-known result that the squarefree algebra satisfies the strong Lefschetz property. Finally, we compute the Betti numbers of the initial ideals and construct a minimal free resolution using a Mayer-Vietoris tree approach.

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