The Cohen-Macaulay Property of f-ideals
Abstract
For positive integers d<n, let [n]d=\A∈ 2[n] |A|=d\ where [n]=:\1,2,…, n\. For a pure f-simplicial complex such that dim()= dim(c) and F() F(c)=, we prove that the facet ideal I() is Cohen-Macaulay if and only if it has linear resolution. For a d-dimensional pure f-simplicial complex such that '=: F F∈ [n]d F() is an f-simplicial complex, we prove that I(c) is Cohen-Macaulay if and only if I(') has linear resolution.
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