On Density-Critical Matroids
Abstract
For a matroid having rank-one flats, the density is unless , in which case . A matroid is density-critical if all of its proper minors of non-zero rank have lower density. By a 1965 theorem of Edmonds, a matroid that is minor-minimal among simple matroids that cannot be covered by independent sets is density-critical. It is straightforward to show that is the only minor-minimal loopless matroid with no covering by independent sets. We prove that there are exactly ten minor-minimal simple obstructions to a matroid being able to be covered by two independent sets. These ten matroids are precisely the density-critical matroids such that but for all proper minors of . All density-critical matroids of density less than are series-parallel networks. For , although finding all density-critical matroids of density at most does not seem straightforward, we do solve this problem for .
Cite
@article{arxiv.1903.05877,
title = {On Density-Critical Matroids},
author = {Rutger Campbell and Kevin Grace and James Oxley and Geoff Whittle},
journal= {arXiv preprint arXiv:1903.05877},
year = {2020}
}
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16 pages