Betti table Stabilization of Homogeneous Monomial Ideals
Abstract
Given an homogeneous monomial ideal I, we provide a question- and example-based investigation of the stabilization patterns of the Betti tables shapes of Id as we vary d. We build off Whieldon's definition of the stabilization index of I, Stab(I), to define the stabilization sequence of I, StabSeq(I), and use it to explore changes in the shapes of the Betti tables of Id as we vary d. We also present the stabilization indices and sequences of the collection of ideals \In\ where In=(a2nb2nc2n,b4nc2n,a3nc3n,a6n-1b)⊂eq [a,b,c].
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