Free matroid

In mathematics, the free matroid over a given ground-set $E$ is the matroid in which the independent sets are all subsets of $E$ . It is a special case of a uniform matroid; specifically, when $E$ has cardinality $n$ , it is the uniform matroid $U{}_{n}^{n}$ . The unique basis of this matroid is the ground-set itself, $E$ . Among matroids on $E$ , the free matroid on $E$ has the most independent sets, the highest rank, and the fewest circuits.

Every free matroid with a ground set of size $n$ is the graphic matroid of an $n$ -edge forest.

Free extension of a matroid

The free extension of a matroid $M$ by some element $e\not \in M$ , denoted $M+e$ , is a matroid whose elements are the elements of $M$ plus the new element $e$ , and:

Its circuits are the circuits of $M$ plus the sets $B\cup \{e\}$ for all bases $B$ of $M$ .
Equivalently, its independent sets are the independent sets of $M$ plus the sets $I\cup \{e\}$ for all independent sets $I$ that are not bases.
Equivalently, its bases are the bases of $M$ plus the sets $I\cup \{e\}$ for all independent sets of size ${\text{rank}}(M)-1$ .