In mathematics, an uncountable set, informally, is an infinite set that contains too many elements to be countable. The uncountability of a set is closely related to its cardinal number: a set is uncountable if its cardinal number is larger than aleph-null, the cardinality of the natural numbers.
There are many equivalent characterizations of uncountability. A set X is uncountable if and only if any of the following conditions hold:
\aleph0
\aleph0
The first three of these characterizations can be proven equivalent in Zermelo–Fraenkel set theory without the axiom of choice, but the equivalence of the third and fourth cannot be proved without additional choice principles.
The best known example of an uncountable set is the set R of all real numbers; Cantor's diagonal argument shows that this set is uncountable. The diagonalization proof technique can also be used to show that several other sets are uncountable, such as the set of all infinite sequences of natural numbers and the set of all subsets of the set of natural numbers. The cardinality of R is often called the cardinality of the continuum, and denoted by
ak{c}
| \aleph0 | |
| 2 |
\beth1
The Cantor set is an uncountable subset of R. The Cantor set is a fractal and has Hausdorff dimension greater than zero but less than one (R has dimension one). This is an example of the following fact: any subset of R of Hausdorff dimension strictly greater than zero must be uncountable.
Another example of an uncountable set is the set of all functions from R to R. This set is even "more uncountable" than R in the sense that the cardinality of this set is
\beth2
\beth1
A more abstract example of an uncountable set is the set of all countable ordinal numbers, denoted by Ω or ω1.[1] The cardinality of Ω is denoted
\aleph1
\aleph1
\beth1
\aleph1
\beth1
\aleph1
\aleph1=\beth1
See main article: Dedekind-infinite set. Without the axiom of choice, there might exist cardinalities incomparable to
\aleph0
If the axiom of choice holds, the following conditions on a cardinal
\kappa
\kappa\nleq\aleph0;
\kappa>\aleph0;
\kappa\geq\aleph1
\aleph1=|\omega1|
\omega1
\omega.
However, these may all be different if the axiom of choice fails. So it is not obvious which one is the appropriate generalization of "uncountability" when the axiom fails. It may be best to avoid using the word in this case and specify which of these one means.