Cumulative hierarchy
In mathematics, specifically set theory, a cumulative hierarchy is a family of sets Wα indexed by ordinals α such that
- Wα ⊆ Wα+1
- If α is a limit ordinal, then Wα = ∪β<α Wβ
Some authors additionally require that Wα+1 ⊆ P(Wα) or that W0 is empty.
The union W of the sets of a cumulative hierarchy is often used as a model of set theory.
The phrase "the cumulative hierarchy" usually refers to the standard cumulative hierarchy Vα of the von Neumann universe with Vα+1 = P(Vα) introduced by Zermelo (1930).
Reflection principle
A cumulative hierarchy satisfies a form of the reflection principle: any formula in the language of set theory that holds in the union W of the hierarchy also holds in some stages Wα.
Examples
- The von Neumann universe is built from a cumulative hierarchy Vα.
- The sets Lα of the constructible universe form a cumulative hierarchy.
- The Boolean-valued models constructed by forcing are built using a cumulative hierarchy.
- The well founded sets in a model of set theory (possibly not satisfying the axiom of foundation) form a cumulative hierarchy whose union satisfies the axiom of foundation.
References
- Jech, Thomas (2003). Set Theory. Springer Monographs in Mathematics (Third Millennium ed.). Berlin, New York: Springer-Verlag. ISBN 978-3-540-44085-7. Zbl 1007.03002.
- Zermelo, Ernst (1930). "Über Grenzzahlen und Mengenbereiche: Neue Untersuchungen über die Grundlagen der Mengenlehre". Fundamenta Mathematicae. 16: 29–47.CS1 maint: ref=harv (link)
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