English

Finite factorization is detected by undermonoids

Group Theory 2026-05-28 v3

Abstract

Let MM be a cancellative commutative monoid and call a submonoid SS of MM an undermonoid if \G(S)=\G(M)\G(S)=\G(M) inside the Grothendieck group of MM. Gotti and Li asked whether the finite factorization property is hereditary once it is known on all undermonoids: if every undermonoid of MM is a finite factorization monoid, must every submonoid of MM be a finite factorization monoid? We give an affirmative answer. Equivalently, for every cancellative commutative monoid MM, the following two conditions coincide: every submonoid of MM is an FFM, and every undermonoid of MM is an FFM. The proof isolates a fixed length \ell and an infinite set of length-\ell factorizations of one element bb. In the non-group case, a divisor-complement ideal I={mM:mMb}I=\{m\in M:m\nmid_M b\} enlarges the bad submonoid to a bad undermonoid while preserving the chosen length-\ell factorizations. In the group case, a maximality argument over submonoids for which these factorizations survive is combined with a two-sided perturbation SS+\Nzero(2b+u)S\mapsto S+\Nzero(2b+u). The key point is that the perturbation creates no new units and does not split any atom occurring in the fixed factorizations. This yields an undermonoid with infinitely many factorizations of bb, contradicting the hypothesis.

Keywords

Cite

@article{arxiv.2605.20974,
  title  = {Finite factorization is detected by undermonoids},
  author = {Yutong Zhang and Yaoran Yang},
  journal= {arXiv preprint arXiv:2605.20974},
  year   = {2026}
}