Edge ideals and DG algebra resolutions
Commutative Algebra
2015-06-09 v1 Combinatorics
Abstract
Let where and is a homogeneous ideal in . The acyclic closure of over 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 , a DG algebra resolution of over . By a theorem of Avramov there is a tight connection between these two resolutions. In this paper we study these two resolutions when is the edge ideal of a path or a cycle. We determine the behavior of the deviations , which are the number of variables in in homological degree . We apply our results to the study of the -algebra structure of the Koszul homology of .
Cite
@article{arxiv.1504.01450,
title = {Edge ideals and DG algebra resolutions},
author = {Adam Boocher and Alessio D'Alì and Eloísa Grifo and Jonathan Montaño and Alessio Sammartano},
journal= {arXiv preprint arXiv:1504.01450},
year = {2015}
}