English

Large girth approximate Steiner triple systems

Combinatorics 2019-12-09 v2 Probability

Abstract

In 1973 Erdos asked whether there are n-vertex partial Steiner triple systems with arbitrary high girth and quadratically many triples. (Here girth is defined as the smallest integer g \ge 4 for which some g-element vertex-set contains at least g-2 triples.) We answer this question, by showing existence of approximate Steiner triple systems with arbitrary high girth. More concretely, for any fixed \ell \ge 4 we show that a natural constrained random process typically produces a partial Steiner triple system with (1/6-o(1))n^2 triples and girth larger than \ell. The process iteratively adds random triples subject to the constraint that the girth remains larger than \ell. Our result is best possible up to the o(1)-term, which is a negative power of n.

Keywords

Cite

@article{arxiv.1808.01065,
  title  = {Large girth approximate Steiner triple systems},
  author = {Tom Bohman and Lutz Warnke},
  journal= {arXiv preprint arXiv:1808.01065},
  year   = {2019}
}

Comments

16 pages; minor edits; to appear in Journal of the London Mathematical Society (JLMS)

R2 v1 2026-06-23T03:23:27.414Z