Axiom of choice: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>Howard C. Berkowitz
No edit summary
imported>Richard Pinch
(Equivalent formulations)
Line 2: Line 2:
In [[mathematics]], the '''Axiom of Choice'''  or '''AC''' is a fundamental principle in [[set theory]] which states that it is possible to choose an element out of each of infinitely many sets simultaneously.  The validity of the axiom is not universally accepted among mathematicians and [[Kurt Gödel]] showed that it was independent of the other axioms of set theory.
In [[mathematics]], the '''Axiom of Choice'''  or '''AC''' is a fundamental principle in [[set theory]] which states that it is possible to choose an element out of each of infinitely many sets simultaneously.  The validity of the axiom is not universally accepted among mathematicians and [[Kurt Gödel]] showed that it was independent of the other axioms of set theory.


One formulation of the axiom is that the [[Cartesian product]] of any family of non-empty sets is again non-empty.
The axiom states that if <math>\mathcal A</math> is a family of non-empty sets, there is a ''choice function'' <math>f : \mathcal{A} \rightarrow \cup \mathcal A</math> such that for each <math>A \in \mathcal A</math> we have <math>f(A) \in A</math>: that is, <math>f</math> "chooses" an element of each member of the family <math>\mathcal A</math>.


AC is equivalent to [[Zorn's Lemma]] and to the [[Well-ordering Principle]].  
A closely related formulation of the axiom is that the [[Cartesian product]] of any family of non-empty sets is again non-empty.


==References==
==Equivalent formulations==
* {{cite book | author=Paul Halmos | authorlink=Paul Halmos | title=Naive set theory | series=The University Series in Undergraduate Mathematics | publisher=[[Van Nostrand Reinhold]] | year=1960 | pages=59-69 }}
There are a number of statements equivalent to the Axiom of Choice.
* {{cite book | author=Michael D. Potter | title=Sets: An Introduction | publisher=[[Oxford University Press]] | year=1990 | isbn=0-19-853399-3 | pages=137-159 }}
 
* [[Zorn's Lemma]]: If every [[linear order|chain]] in a [[Partial order|partially ordered set]] has an upper bound, then the set has a maximal element.
* The [[Well-ordering Principle]]: Every set can be well-ordered.
* [[Tukey's Lemma]]: Every non-empty system of finite character has a maximal element.
* [[Zermelo's Postulate]]: If <math>\mathcal A</math> is a family of non-empty sets, there is a set <math>C</math> such that <math>C \cap A</math> has exactly one element for each <math>A \in \mathcal A</math>.
* [[Tychonov's Theorem]]: The product of a family of non-empty [[compact space|compact topological space]]s is compact in the [[product topology]].

Revision as of 12:28, 5 January 2013

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

In mathematics, the Axiom of Choice or AC is a fundamental principle in set theory which states that it is possible to choose an element out of each of infinitely many sets simultaneously. The validity of the axiom is not universally accepted among mathematicians and Kurt Gödel showed that it was independent of the other axioms of set theory.

The axiom states that if is a family of non-empty sets, there is a choice function such that for each we have : that is, "chooses" an element of each member of the family .

A closely related formulation of the axiom is that the Cartesian product of any family of non-empty sets is again non-empty.

Equivalent formulations

There are a number of statements equivalent to the Axiom of Choice.