In mathematics, the cardinality of the continuum (sometimes also called the power of the continuum) is the cardinal number of the set of real numbers R (sometimes called the continuum). This cardinal number is often denoted by , so .
Properties
Uncountability
Georg Cantor introduced the concept of cardinality to compare the sizes of infinite sets. He famously showed that the set of real numbers is uncountably infinite; i.e. is strictly greater than the cardinality of the natural numbers, (aleph-null):
In other words, there are strictly more real numbers than there are integers. Cantor proved this statement in several different ways. See Cantor's first uncountability proof and Cantor's diagonal argument.
Cardinal equalities
A variation on Cantor's diagonal argument can be used to prove Cantor's theorem which states that the cardinality of any set is strictly less than that of its power set, i.e. |A| < 2|A|. One concludes that the power set P(N) of the natural numbers N is uncountable. It is then natural to ask whether the cardinality of P(N) is equal to . It turns out that the answer is yes. One can prove this in two steps:
- Define a map f : R → P(Q) from the reals to the power set of the rationals by sending each real number x to the set of all rationals less than or equal to x (with the reals viewed as Dedekind cuts, this is nothing other than the inclusion map in the set of sets of rationals). This map is injective since the rationals are dense in R. Since the rationals are countable we have that .
- Let {0,2}N be the set of infinite sequences with values in set {0,2}. This set clearly has cardinality (the natural bijection between the set of binary sequences and P(N) is given by the indicator function). Now associate to each such sequence (ai) the unique real number in the interval [0,1] with the ternary-expansion given by the digits (ai), i.e. the i-th digit after the decimal point is ai. The image of this map is called the Cantor set. It is not hard to see that this map is injective, for by avoiding points with the digit 1 in their ternary expansion we avoid conflicts created by the fact that the ternary-expansion of a real number is not unique. We then have that .
By the Cantor–Bernstein–Schroeder theorem we conclude that
The cardinal equality can be demonstrated using cardinal arithmetic:
This argument is a condensed version of the notion of interleaving two binary sequences: let be the binary expansion of and let be the binary expansion of . Then , the interleaving of the binary expansions, is a well-defined function when and have unique binary expansions. Only countably many reals have non-unique binary expansions.
By using the rules of cardinal arithmetic one can also show that
where n is any finite cardinal ≥ 2.
Beth numbers
The sequence of beth numbers is defined by setting and . So is the second beth number, beth-one:
The third beth number, beth-two, is the cardinality of the set of all subsets of the real line:
The continuum hypothesis
The famous continuum hypothesis asserts that is also the second aleph number . In other words, the continuum hypothesis states that there is no set A whose cardinality lies strictly between and
However, this statement is now known to be independent of the axioms of Zermelo-Fraenkel set theory (ZFC). That is, both the hypothesis and its negation are consistent with these axioms. In fact, for every nonzero natural number n, the equality = is independent of ZFC. (The case is the continuum hypothesis.) The same is true for most other alephs, although in some cases equality can be ruled out by König's theorem on the grounds of cofinality, e.g., In particular, could be either or , where is the first uncountable ordinal, so it could be either a successor cardinal or a limit cardinal, and either a regular cardinal or a singular cardinal.
Sets with cardinality c
A great many sets studied in mathematics have cardinality equal to . Some common examples are the following:
- the real numbers R
- any (nondegenerate) closed or open interval in R (such as the unit interval [0,1])
- the irrational numbers
- the transcendental numbers
- Euclidean space Rn
- the complex numbers C
- the power set of the natural numbers (the set of all subsets of the natural numbers)
- the set of sequences of integers (i.e. all functions N → Z, often denoted ZN)
- the set of sequences of real numbers, RN
- the set of all continuous functions from R to R
- the Cantor set
- the Euclidean topology on Rn (i.e. the set of all open sets in Rn)
Sets with cardinality greater than c
Sets with cardinality greater than include:
- the set of all subsets of R, i.e., the power set of R, written P(R) or 2R
- the set RR of all functions from R to R
Both have cardinality 2 ({{#invoke:Beth number|Beth two|Beth two}}).
References
- Paul Halmos, Naive set theory. Princeton, NJ: D. Van Nostrand Company, 1960. Reprinted by Springer-Verlag, New York, 1974. ISBN 0-387-90092-6 (Springer-Verlag edition).
- Jech, Thomas, 2003. Set Theory: The Third Millennium Edition, Revised and Expanded. Springer. ISBN 3-540-44085-2.
- Kunen, Kenneth, 1980. Set Theory: An Introduction to Independence Proofs. Elsevier. ISBN 0-444-86839-9.