English

Counting matroids in minor-closed classes

Combinatorics 2013-03-01 v3

Abstract

A flat cover is a collection of flats identifying the non-bases of a matroid. We introduce the notion of cover complexity, the minimal size of such a flat cover, as a measure for the complexity of a matroid, and present bounds on the number of matroids on nn elements whose cover complexity is bounded. We apply cover complexity to show that the class of matroids without an NN-minor is asymptotically small in case NN is one of the sparse paving matroids U2,kU_{2,k}, U3,6U_{3,6}, P6P_6, Q6Q_6, or R6R_6, thus confirming a few special cases of a conjecture due to Mayhew, Newman, Welsh, and Whittle. On the other hand, we show a lower bound on the number of matroids without M(K4)M(K_4)-minor which asymptoticaly matches the best known lower bound on the number of all matroids, due to Knuth.

Keywords

Cite

@article{arxiv.1302.1315,
  title  = {Counting matroids in minor-closed classes},
  author = {R. A. Pendavingh and J. G. van der Pol},
  journal= {arXiv preprint arXiv:1302.1315},
  year   = {2013}
}

Comments

13 pages, 3 figures

R2 v1 2026-06-21T23:21:40.625Z