Definition:Minimally Inductive Set/Definition 1

Definition
Let $S$ be an infinite successor set.

The minimal infinite successor set $\omega$ is the infinite successor set given by:


 * $\ds \omega := \bigcap \set {S' \subseteq S: S' \text{ is an infinite successor set} }$

that is, $\omega$ is the intersection of every infinite successor set which is a subset of $S$.

Also see

 * Definition:Von Neumann Construction of Natural Numbers