English

The normalized depth function of squarefree powers

Commutative Algebra 2022-09-19 v1 Combinatorics

Abstract

The depth of squarefree powers of a squarefree monomial ideal is introduced. Let II be a squarefree monomial ideal of the polynomial ring S=K[x1,,xn]S=K[x_1,\ldots,x_n]. The kk-th squarefree power I[k]I^{[k]} of II is the ideal of SS generated by those squarefree monomials u1uku_1\cdots u_k with each uiG(I)u_i\in G(I), where G(I)G(I) is the unique minimal system of monomial generators of II. Let dkd_k denote the minimum degree of monomials belonging to G(I[k])G(I^{[k]}). One has depth(S/I[k])dk1\operatorname{depth}(S/I^{[k]}) \geq d_k -1. Setting gI(k)=depth(S/I[k])(dk1)g_I(k) = \operatorname{depth}(S/I^{[k]}) - (d_k - 1), one calls gI(k)g_I(k) the normalized depth function of II. The computational experience strongly invites us to propose the conjecture that the normalized depth function is nonincreasing. In the present paper, especially the normalized depth function of the edge ideal of a finite simple graph is deeply studied.

Keywords

Cite

@article{arxiv.2209.07847,
  title  = {The normalized depth function of squarefree powers},
  author = {Nursel Erey and Jürgen Herzog and Takayuki Hibi and Sara Saeedi Madani},
  journal= {arXiv preprint arXiv:2209.07847},
  year   = {2022}
}
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