Almost Every Matroid has an $M(K_4)$- or a $\mathcal{W}^3$-Minor
Abstract
We show that almost every matroid contains the rank-3 whirl $\mathcal{W}^3$ or the complete-graphic matroid $M(K_4)$ as a minor.
Published
2023-11-17
How to Cite
van der Pol, J. (2023). Almost Every Matroid has an $M(K_4)$- or a $\mathcal{W}^3$-Minor. The Electronic Journal of Combinatorics, 30(4), P4.23. https://doi.org/10.37236/11946
Article Number
P4.23