独立集合族

【どくりつしゅうごうぞく (independent set family)】

有限集合 ${\displaystyle N\,}$ とその部分集合族 ${\displaystyle {\mathcal {I}}\,}$ が以下の (I0)--(I2) を満たすとき, ${\displaystyle {\mathbf {M} }=(N,{\mathcal {I}})\,}$ をマトロイドと呼び, ${\displaystyle {\mathcal {I}}\,}$ を ${\displaystyle {\mathbf {M} }\,}$ の独立集合族と呼ぶ. \vspace{-0.6zw} \begin{description} \item[(I0)] ${\displaystyle \emptyset \in {\mathcal {I}}\,}$. \vspace{-0.6zw} \item[(I1)] ${\displaystyle I\subseteq J\in {\mathcal {I}}\Rightarrow I\in {\mathcal {I}}\,}$. \vspace{-0.6zw} \item[(I2)] ${\displaystyle I,J\in {\mathcal {I}}\,}$, ${\displaystyle |I|<|J|\Rightarrow \exists j\in J\backslash I\,}$: ${\displaystyle I\cup \{j\}\in {\mathcal {I}}\,}$. \end{description}