English

Stanley-Reisner ideals with linear powers

Commutative Algebra 2025-08-15 v1 Combinatorics

Abstract

Let S=K[x1,,xn]S = K[x_1, \dots, x_n] be the standard graded polynomial ring over a field KK. In this paper, we address and completely solve two fundamental open questions in Commutative Algebra: (i) For which degrees dd, does there exist a uniform combinatorial characterization of all squarefree monomial ideals in SS having dd-linear resolutions? (ii) For which degrees dd, does having a linear resolution coincide with having linear powers for all squarefree monomial ideals of SS generated in degree dd? Let In,d(K)\mathcal{I}_{n,d}(K) denote the class of squarefree monomial ideals of SS having a dd-linear resolution. Our main result establishes the equivalence of the following conditions: (a) Any squarefree monomial ideal II in SS generated in degree dd has a linear resolution, if and only if, II has linear powers. (b) In,d(K)\mathcal{I}_{n,d}(K) is independent of the base field KK. (c) d{0,1,2,n2,n1,n}d\in\{0,1,2,n{-}2,n{-}1,n\}. In each of these degrees, we show that a squarefree monomial ideal has a linear resolution if and only if all of its powers admit linear quotients, and we combinatorially classify such ideals. In contrast, for each degree 3dn33\le d\le n{-}3, we construct fully-supported squarefree monomial ideals II and JJ in SS generated in degree dd such that the linear resolution property of II depends on the choice of the base field, JJ has a linear resolution and J2J^2 does not have a linear resolution.

Keywords

Cite

@article{arxiv.2508.10354,
  title  = {Stanley-Reisner ideals with linear powers},
  author = {Antonino Ficarra and Somayeh Moradi},
  journal= {arXiv preprint arXiv:2508.10354},
  year   = {2025}
}
R2 v1 2026-07-01T04:49:18.267Z