Edge ideals and DG algebra resolutions

Adam Boocher; Alessio D'Al\`i; Elo\'isa Grifo; Jonathan Monta\~no,; Alessio Sammartano

arXiv:1504.01450·math.AC·June 9, 2015·2 cites

Edge ideals and DG algebra resolutions

Adam Boocher, Alessio D'Al\`i, Elo\'isa Grifo, Jonathan Monta\~no,, Alessio Sammartano

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Abstract

Let $R = S / I$ where $S = k [T_{1}, \dots, T_{n}]$ and $I$ is a homogeneous ideal in $S$ . The acyclic closure $R ⟨ Y ⟩$ of $k$ over $R$ is a DG algebra resolution obtained by means of Tate's process of adjoining variables to kill cycles. In a similar way one can obtain the minimal model $S [X]$ , a DG algebra resolution of $R$ over $S$ . By a theorem of Avramov there is a tight connection between these two resolutions. In this paper we study these two resolutions when $I$ is the edge ideal of a path or a cycle. We determine the behavior of the deviations $ε_{i} (R)$ , which are the number of variables in $R ⟨ Y ⟩$ in homological degree $i$ . We apply our results to the study of the $k$ -algebra structure of the Koszul homology of $R$ .

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TopicsCommutative Algebra and Its Applications · Pharmacological Receptor Mechanisms and Effects · Topological and Geometric Data Analysis