Set of Sets/Examples/Set of Initial Segments
Example of Set of Sets
Let $\Z$ denote the set of integers.
Let $\map \Z n$ denote the initial segment of $\Z_{> 0}$:
- $\map \Z n = \set {1, 2, \ldots, n}$
Let $\mathscr S := \set {\map \Z n: n \in \Z_{> 0} }$
That is, $\mathscr S$ is the set of all initial segments of $\Z_{> 0}$.
Then:
- $\mathscr S := \set {\set 1, \set {1, 2}, \set {1, 2, 3}, \ldots}$
and we have that:
- $\mathscr S \subsetneq \powerset \Z$
where $\powerset \Z$ denotes the power set of $\Z$.
Sources
- 1965: J.A. Green: Sets and Groups ... (previous) ... (next): $\S 1.8$. Sets of sets: Example $28$