Category:Examples of Matroids
Jump to navigation
Jump to search
This category contains examples of Matroid.
Let $M = \struct {S, \mathscr I}$ be an independence system.
$M$ is called a matroid on $S$ if and only if $M$ also satisfies:
\((\text I 3)\) | $:$ | \(\ds \forall U, V \in \mathscr I:\) | \(\ds \size V < \size U \implies \exists x \in U \setminus V : V \cup \set x \in \mathscr I \) |
Pages in category "Examples of Matroids"
The following 11 pages are in this category, out of 11 total.
M
- Definition:Matroid Induced by Affine Independence
- Definition:Matroid Induced by Algebraic Independence
- Definition:Matroid Induced by Linear Independence
- Definition:Matroid Induced by Linear Independence (Abelian Group)
- Definition:Matroid Induced by Linear Independence (Vector Space)
- Definition:Matroid Induced by Linear Independence/Abelian Group
- Definition:Matroid/Examples