Geodesic
On density-critical matroids
Rutger Campbell1 ; Kevin Grace2 ; James Oxley3 ; Geoff Whittle4
1University of Waterloo
2University of Bristol
3Louisiana State University
4Victoria University of Wellington
The electronic journal of combinatorics, Tome 27 (2020) no. 2
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For a matroid $M$ having $m$ rank-one flats, the density $d(M)$ is $\tfrac{m}{r(M)}$ unless $m = 0$, in which case $d(M)= 0$. 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 $k$ independent sets is density-critical. It is straightforward to show that $U_{1,k+1}$ is the only minor-minimal loopless matroid with no covering by $k$ 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 $M$ such that $d(M) > 2$ but $d(N) \le 2$ for all proper minors $N$ of $M$. All density-critical matroids of density less than $2$ are series-parallel networks. For $k \ge 2$, although finding all density-critical matroids of density at most $k$ does not seem straightforward, we do solve this problem for $k=\tfrac{9}{4}$.
DOI : 10.37236/8584
Classification : 05B35, 52B40, 05C83
Mots-clés : minor-minimal simple obstructions to a matroid

Rutger Campbell  1   ; Kevin Grace  2   ; James Oxley  3   ; Geoff Whittle  4

1 University of Waterloo
2 University of Bristol
3 Louisiana State University
4 Victoria University of Wellington 
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Rutger Campbell; Kevin Grace; James Oxley; Geoff Whittle. On density-critical matroids. The electronic journal of combinatorics, Tome 27 (2020) no. 2. doi: 10.37236/8584

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