English

Global Product Intersection Sets in Semigroups

Combinatorics 2026-04-28 v2 Group Theory Number Theory

Abstract

For a family (Aq)qQ(A_q)_{q\in Q} of subsets of a semigroup, the product intersection set records those exponents hNh \in \mathbb{N} for which the hh-fold product set of the intersection, (qAq)h(\bigcap_q A_q)^h, is equal to qAqh\bigcap_q A_q^h, the intersection of the product sets. Nathanson recently asked which subsets of N\mathbb{N} can occur as a product intersection set, both for arbitrary and for decreasing families (Aq)qQ(A_q)_{q\in Q}. We solve both problems by giving a complete classification. In particular, when Q2|Q| \ge 2, we show that in either case any subset XNX \subseteq \mathbb{N} with 1X1 \in X occurs as a product intersection set. Both classifications were autonomously discovered and formally verified in Lean by Aristotle, a formal reasoning agent developed by Harmonic.

Keywords

Cite

@article{arxiv.2604.18869,
  title  = {Global Product Intersection Sets in Semigroups},
  author = {Wouter van Doorn and Pietro Monticone and Quanyu Tang},
  journal= {arXiv preprint arXiv:2604.18869},
  year   = {2026}
}

Comments

8 pages

R2 v1 2026-07-01T12:27:18.843Z