English

Some heterochromatic theorems for matroids

Combinatorics 2017-08-30 v1

Abstract

The anti-Ramsey number of Erd\"os, Simonovits and S\'os from 1973 has become a classic invariant in Graph Theory. To study this invariant in Matroid Theory, we use a related invariant introduce by Arocha, Bracho and Neumann-Lara. The heterochromatic number hc(H)hc(H) of a non-empty hypergraph HH is the smallest integer kk such that for every colouring of the vertices of HH with exactly kk colours, there is a totally multicoloured hyperedge of HH. Given a rank-rr matroid MM, there are several hypergraphs associated to the matroid that we can consider. One is C(M)C(M) , the hypergraph where the points are the elements of the matroid and the hyperedges are the circuits of MM. The other one is B(M)B(M), where here the points are the elements and the hyperedges are the bases of the matroid. We prove that hc(C(M))hc(C(M)) equals r+1r+1 when MM is not the free matroid Un,nU_{n,n}, and that if MM is a paving matroid, then hc(B(M))hc(B(M)) equals rr. Then we explore the case when the hypergraph has the Hamiltonian circuits of the matroid as hyperedges, if any, for a class of paving matroids. We also extend the trivial observation of Erd\"os, Simonovits and S\'os for the anti-Ramsey number for 3-cycles to 3-circuits in projective geometries over finite fields.

Keywords

Cite

@article{arxiv.1708.08562,
  title  = {Some heterochromatic theorems for matroids},
  author = {Criel Merino and Juan José Montellano-Ballesteros},
  journal= {arXiv preprint arXiv:1708.08562},
  year   = {2017}
}

Comments

Version 1.2, 15 pages, no figures

R2 v1 2026-06-22T21:25:50.506Z