English

Strongly Minimal Steiner Systems I: Existence

Logic 2020-01-22 v4

Abstract

A linear space is a system of points and lines such that any two distinct points determine a unique line; a Steiner kk-system (for k2k \geq 2) is a linear space such that each line has size exactly kk. Clearly, as a two-sorted structure, no linear space can be strongly minimal. We formulate linear spaces in a (bi-interpretable) vocabulary τ\tau with a single ternary relation RR. We prove that for every integer kk there exist 202^{\aleph_0}-many integer valued functions μ\mu such that each μ\mu determines a distinct strongly minimal Steiner kk-system Gμ\mathcal{G}_\mu, whose algebraic closure geometry has all the properties of the ab initio Hrushovski construction. Thus each is a counterexample to the Zilber Trichotomy Conjecture.

Keywords

Cite

@article{arxiv.1903.03541,
  title  = {Strongly Minimal Steiner Systems I: Existence},
  author = {John Baldwin and Gianluca Paolini},
  journal= {arXiv preprint arXiv:1903.03541},
  year   = {2020}
}
R2 v1 2026-06-23T08:02:28.530Z