transitive (idea)

A set A is said to be transitive if whenever x is in A and y is in x then y is in A. In other words, every member of A is a subset of A.

The axiom of foundation implies that any transitive set must contain the empty set.

Examples of useful transitive sets are:

• Every natural number is transitive
• More generally, every ordinal (and therefore every cardinal) is transitive
• Each member V_a of the cumulative heirachy of sets (sets formed from the empty set by repeatededly taking power sets) is transitive