English

Macaulay's theorem for vector-spread algebras

Commutative Algebra 2024-05-14 v3

Abstract

Let S=K[x1,,xn]S=K[x_1,\dots,x_n] be the standard graded polynomial ring, with KK a field, and let t=(t1,,td1)Z0d1{\bf t}=(t_1,\ldots,t_{d-1})\in{\mathbb{Z}}_{\ge 0}^{d-1}, d2d\ge 2, be a (d1)(d-1)-tuple whose entries are non negative integers. To a t{\bf t}-spread ideal II in SS, we associate a unique ftf_{\bf t}-vector and we prove that if II is t{\bf t}-spread strongly stable, then there exists a unique t{\bf t}-spread lex ideal which shares the same ftf_{\bf t}-vector of II via the combinatorics of the t{\bf t}-spread shadows of special sets of monomials of SS. Moreover, we characterize the possible ftf_{\bf t}-vectors of t{\bf t}-vector spread strongly stable ideals generalizing the well-known theorems of Macaulay and Kruskal-Katona. Finally, we prove that among all t{\bf t}-spread strongly stable ideals with the same ftf_{\bf t}-vector, the t{\bf t}-spread lex ideals have the largest Betti numbers.

Cite

@article{arxiv.2302.07595,
  title  = {Macaulay's theorem for vector-spread algebras},
  author = {Marilena Crupi and Antonino Ficarra and Ernesto Lax},
  journal= {arXiv preprint arXiv:2302.07595},
  year   = {2024}
}

Comments

This is the final version of our paper, accepted for publication in the International Journal of Algebra and Computation

R2 v1 2026-06-28T08:40:38.050Z