Zermelo-Fraenkel axioms: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>John R. Brews
(Move sources to bibliography)
imported>John R. Brews
(link)
Line 22: Line 22:
&emsp;9. <u>Axiom of choice</u>: Every family of nonempty sets has a choice function
&emsp;9. <u>Axiom of choice</u>: Every family of nonempty sets has a choice function


For further discussion of these axioms, see the [http://en.citizendium.org/wiki?action=edit&preload=Template%3ASubpages_name&title=Zermelo-Fraenkel_axioms/Bibliography bibliography].
For further discussion of these axioms, see the [http://en.citizendium.org/wiki/Zermelo-Fraenkel_axioms/Bibliography bibliography].


==References==
==References==
<references/>
<references/>

Revision as of 16:06, 11 May 2011

This article is a stub and thus not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
 
This editable Main Article is under development and subject to a disclaimer.

The Zermelo-Fraenkel axioms form one of several possible formulations of axiomatic set theory.

The axioms

There are eight Zermelo-Fraenkel (ZF) axioms:[1]

  1. Axiom of extensionality: If X and Y have the same elements, then X=Y
  2. Axiom of pairing: For any a and b there exists a set {a, b} that contains exactly a and b
  3. Axiom schema of separation: If φ is a property with parameter p, then for any X and p there exists a set Y that contains all those elements uX that have the property φ; that is, the set Y={uX(u, p)}
  4. Axiom of union: For any set X there exists a set Y=∪X, the union of all elements of X
  5. Axiom of power set: For any X there exists a set Y=P(X), the set of all subsets of X
  6. Axiom of infinity: There exists an infinite set
  7. Axiom schema of replacement: If f is a function, then for any X there exists a set Y, denoted F(X) such that F(X)={f(x)|xX}
  8. Axiom of regularity: Every nonempty set has an ∈-minimal element

If to these is added the axiom of choice, the theory is designated as the ZFC theory:

 9. Axiom of choice: Every family of nonempty sets has a choice function

For further discussion of these axioms, see the bibliography.

References

  1. Thomas J Jech (1978). Set theory. Academic Press. ISBN 0123819504.