A note on Artin Gorenstein algebras with Hilbert function (1,4,k,k,4,1)
Abstract
We study the free resolutions of some Artin Gorenstein algebras of Hilbert function (1,4,k,k,4,1) and we prove that all such algebras have the Strong Lefschetz property if they have the Weak Lefschetz property. In the case k=4 we prove that the Hilbert function alone fixes the betti table. For higher k stronger conditions on the algebras are needed to fix the betti table. In particular, if the algebra is a complete intersection or if it is defined by an equigenerated ideal then the betti table is unique.
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