English

Modular Frobenius pseudo-varieties

Group Theory 2023-01-09 v2

Abstract

If mNm \in \mathbb{N} and AA is a finite subset of kN{0,1}{1,,m1}k\bigcup_{k \in \mathbb{N} \setminus \{0,1\}} \{1,\ldots,m-1\}^k, then we denote by \begin{align*} \mathscr{C}(m,A) = \left\{S\in \mathscr{S}_m \mid s_1+\cdots+s_k-m \in S \mbox{ if } (s_1,\ldots,s_k)\in S^k \mbox{ and }\right. \\ \left.(s_1 \bmod m, \ldots, s_k \bmod m)\in A \right\}. \end{align*} In this work we prove that C(m,A)\mathscr{C}(m,A) is a Frobenius pseudo-variety. We also show algorithms that allows us to establish whether a numerical semigroup belongs to C(m,A)\mathscr{C}(m,A) and to compute all the elements of C(m,A)\mathscr{C}(m,A) with a fixed genus. Moreover, we introduce and study three families of numerical semigroups, called of second-level, thin and strong, and corresponding to C(m,A)\mathscr{C}(m,A) when A={1,,m1}3A=\{1,\ldots,m-1\}^3, A={(1,1),,(m1,m1)}A=\{(1,1),\ldots,(m-1,m-1)\}, and A={1,,m1}2{(1,1),,(m1,m1)}A=\{1,\ldots,m-1\}^2 \setminus \{(1,1),\ldots,(m-1,m-1)\}, respectively.

Keywords

Cite

@article{arxiv.2101.10724,
  title  = {Modular Frobenius pseudo-varieties},
  author = {Aureliano M. Robles-Pérez and José Carlos Rosales},
  journal= {arXiv preprint arXiv:2101.10724},
  year   = {2023}
}

Comments

18 pages, 4 figures

R2 v1 2026-06-23T22:32:27.615Z