The Von Neumann universe reference article from the English Wikipedia on 24-Apr-2004 (provided by Fixed Reference: snapshots of Wikipedia from wikipedia.org)

Von Neumann universe

In axiomatic set theory and related branches of mathematics, the Von Neumann universe, or Von Neumann hierarchy of sets is the class of all sets, divided into a transfinite hierarchy of individual sets.

This may be defined by transfinite recursion as follows:

• Let V₀ be the empty set.
• For a an ordinal number, let V_a+ (where a+ is the successor ordinal of a) be the power set of V_a.
• For b a limit ordinal, let V_b be the union of all the V-stages so far:

.

• Finally, let V be the union of all the V-stages:

.

If ω is the set of natural numbers, then V_ω is the set of hereditarily finite sets, which is a model of set theory without the axiom of infinity. V_ω+ω is the universe of "ordinary mathematics", which is a model of Zermelo set theory. If k is an inaccessible cardinal, then V_k is a model of Zermelo-Fraenkel set theory itself.

Note that every individual stage V_a is a set, but their union V is a proper class. The sets in V are called hereditarily well-founded sets; the axiom of foundation guarantees that every set is hereditarily well founded. Given any set A, the smallest ordinal number i such that A belongs to V_i is the hereditary rank of A.

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