English

Finite Generation in Polynomial Semirings

Commutative Algebra 2026-04-14 v1

Abstract

We study the semiring N0[α]\mathbb{N}_0[\alpha] as an additive monoid where α\alpha is a positive real algebraic number. In the atomic case, the atoms of N0[α]\mathbb{N}_0[\alpha] are precisely the powers αn\alpha^n up to a certain nonnegative integer nn, and finite generation is governed by divisibility of the minimal polynomial by a negative-tail polynomial. Our first main result gives a complete characterization when the minimal polynomial has the form mα(X)=pα(X)c\mathfrak{m}_\alpha(X)=p_\alpha(X)-c with cNc\in\mathbb{N}. Our second main result shows that finite generation forces α\alpha to be a weak Perron number. As an application, we analyze cubic minimal polynomials and obtain a partial classification of rank-33 monoids N0[α]\mathbb{N}_0[\alpha] by generation and factorization type, including coefficient constraints, non--length-factoriality results for a large family, and examples with prescribed numbers of atoms.

Keywords

Cite

@article{arxiv.2604.11569,
  title  = {Finite Generation in Polynomial Semirings},
  author = {Mohammad El Asal and Wael Mahboub},
  journal= {arXiv preprint arXiv:2604.11569},
  year   = {2026}
}
R2 v1 2026-07-01T12:06:37.338Z