be
a collection of nonempty sets. Then we can choose a element from each
set
so
that there exists a function
(called
a choice function) defined onwith
the property that, for each set
University Maths Notes: Set Theory – The Axiom of Choice
Definition: Axiom of Choice. Letbe
a collection of nonempty sets. Then we can choose a element from each
setso
that there exists a function(called
a choice function) defined onwith
the property that, for each set
Initially controversial, it is now a basic assumption used in many areas of maths. It is independent of the other axioms of set theory. Thus there are no contradictions in choosing to reject it and choosing another instead. The axiom can be stated in many equivalent ways. For example:
The cardinality of any of two sets is less than or equal to the cardinality of the other. one set has cardinality less than or equal to that of the other. This implies there exists a bijection from one set to a subset of the other.
Any vector space over a field
has
a basis -- a maximal linearly independent subset -- over that field.
Any product of compact topological spaces is compact.
The axiom of choice is equivalent to the well-ordering principle.
Examples of choice functions
Ifis
the collection of all nonempty subsets of
then
is
one possible choice function.
Ifis
the collection of all bounded intervals of
we
can let
be
the midpoint of the interval
No choice function has ever been found whenis
the collection of all nonempty subsets of the real numbers, and it
may be that non exists.