English

Enumerating Matroids and Linear Spaces

Combinatorics 2024-05-31 v2

Abstract

We show that the number of linear spaces on a set of nn points and the number of rank-3 matroids on a ground set of size nn are both of the form (cn+o(n))n2/6(cn+o(n))^{n^2/6}, where c=e3/23(1+3)/2c=e^{\sqrt 3/2-3}(1+\sqrt 3)/2. This is the final piece of the puzzle for enumerating fixed-rank matroids at this level of accuracy: the numbers of rank-1 and rank-2 matroids on a ground set of size nn have exact representations in terms of well-known combinatorial functions, and it was recently proved by van der Hofstad, Pendavingh, and van der Pol that for constant r4r\ge 4 there are (e1rn+o(n))nr1/r!(e^{1-r}n+o(n))^{n^{r-1}/r!} rank-rr matroids on a ground set of size nn. In our proof, we introduce a new approach for bounding the number of clique decompositions of a complete graph, using quasirandomness instead of the so-called entropy method that is common in this area.

Keywords

Cite

@article{arxiv.2112.03788,
  title  = {Enumerating Matroids and Linear Spaces},
  author = {Matthew Kwan and Ashwin Sah and Mehtaab Sawhney},
  journal= {arXiv preprint arXiv:2112.03788},
  year   = {2024}
}
R2 v1 2026-06-24T08:07:46.373Z