English

Factorization invariants in half-factorial affine semigroups

Commutative Algebra 2013-10-09 v1

Abstract

Let NA\mathbb{N} \mathcal{A} be the monoid generated by A=a1,...,anZd.\mathcal{A} = {\mathbf{a}_1, ..., \mathbf{a}_n} \subseteq \mathbb{Z}^d. We introduce the homogeneous catenary degree of NA\mathbb{N} \mathcal{A} as the smallest NNN \in \mathbb N with the following property: for each aNA\mathbf{a} \in \mathbb{N} \mathcal{A} and any two factorizations u,v\mathbf{u}, \mathbf{v} of a\mathbf{a}, there exists factorizations u=w1,...,wt=v\mathbf{u} = \mathbf{w}_1, ..., \mathbf{w}_t = \mathbf{v} of a\mathbf{a} such that, for every k,d(wk,wk+1)N,k, \mathrm{d}(\mathbf{w}_k, \mathbf{w}_{k+1}) \leq N, where d\mathrm{d} is the usual distance between factorizations, and the length of wk,wk,\mathbf{w}_k, |\mathbf{w}_k|, is less than or equal to maxu,v.\max{|\mathbf{u}|, |\mathbf{v}|}. We prove that the homogeneous catenary degree of NA\mathbb{N} \mathcal{A} improves the monotone catenary degree as upper bound for the ordinary catenary degree, and we show that it can be effectively computed. We also prove that for half-factorial monoids, the tame degree and the ω\omega-primality coincide, and that all possible catenary degrees of the elements of an affine semigroup of this kind occur as the catenary degree of one of its Betti elements.

Keywords

Cite

@article{arxiv.1207.5838,
  title  = {Factorization invariants in half-factorial affine semigroups},
  author = {Pedro A. García-Sánchez and Ignacio Ojeda and Alfredo Sánchez-R. -Navarro},
  journal= {arXiv preprint arXiv:1207.5838},
  year   = {2013}
}

Comments

8 pages, 1 figure

R2 v1 2026-06-21T21:40:57.429Z