English

Homological shift ideals

Commutative Algebra 2020-03-10 v1

Abstract

For a monomial ideal II, we consider the iith homological shift ideal of II, denoted by HSi(I)\text{HS}_i(I), that is, the ideal generated by the iith multigraded shifts of II. Some algebraic properties of this ideal are studied. It is shown that for any monomial ideal II and any monomial prime ideal PP, HSi(I(P))HSi(I)(P)\text{HS}_i(I(P))\subseteq \text{HS}_i(I)(P) for all ii, where I(P)I(P) is the monomial localization of II. In particular, we consider the homological shift ideal of some families of monomial ideals with linear quotients. For any c\textbf{c}-bounded principal Borel ideal II and for the edge ideal of complement of any path graph, it is proved that HSi(I)\text{HS}_i(I) has linear quotients for all ii. As an example of c\textbf{c}-bounded principal Borel ideals, Veronese type ideals are considered and it is shown that the homological shift ideal of these ideals are polymatroidal. This implies that for any polymatroidal ideal which satisfies the strong exchange property, HSj(I)\text{HS}_j(I) is again a polymatroidal ideal for all jj. Moreover, for any edge ideal with linear resolution, the ideal HSj(I)\text{HS}_j(I) is characterized and it is shown that HS1(I)\text{HS}_1(I) has linear quotients.

Keywords

Cite

@article{arxiv.2003.03966,
  title  = {Homological shift ideals},
  author = {Jürgen Herzog and Somayeh Moradi and Masoomeh Rahimbeigi and Guangjun Zhu},
  journal= {arXiv preprint arXiv:2003.03966},
  year   = {2020}
}
R2 v1 2026-06-23T14:08:22.941Z