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{{short description|On decreasing nested sequences of non-empty compact sets}}
'''Cantor's intersection theorem''',<ref>{{Cite web |last=Weisstein |first=Eric W. |title=Cantor's Intersection Theorem |url=https://mathworld.wolfram.com/CantorsIntersectionTheorem.html |access-date=2025-06-20 |website=mathworld.wolfram.com |language=en}}</ref> also called '''Cantor's nested intervals theorem''',<ref>{{Cite book |last=Segura |first=Julio |url=https://www.google.com.br/books/edition/An_Eponymous_Dictionary_of_Economics/Z6Oy4L-6LSwC |title=An Eponymous Dictionary of Economics: A Guide to Laws and Theorems Named After Economists |last2=Braun |first2=Carlos Rodríguez |date=2004-01-01 |publisher=Edward Elgar Publishing |isbn=978-1-84542-360-5 |pages=38 |language=en}}</ref><ref>{{Cite book |last=Denlinger |first=Charles G. |url=https://www.google.com.br/books/edition/Elements_of_Real_Analysis/CeTkVSXlj4cC |title=Elements of Real Analysis |date=2010-05-08 |publisher=Jones & Bartlett Publishers |isbn=978-1-4496-5993-6 |pages=103 |language=en}}</ref> refers to two closely related theorems in [[general topology]] and [[real analysis]], named after [[Georg Cantor]], about intersections of decreasing nested [[sequence]]s of non-empty compact sets.
==Topological statement==
:<math>C_0 \supseteq C_1 \supseteq \cdots C_k \supseteq C_{k+1} \cdots, \, </math>▼
'''Theorem.''' ''Let <math> S </math> be a [[topological space]]. A decreasing nested sequence of non-empty compact, closed subsets of <math>S</math> has a non-empty intersection. In other words, supposing <math>(C_k)_{k \geq 0}</math> is a sequence of non-empty compact, closed subsets of S satisfying''
:<math>C_0 \supset C_1 \supset \cdots \supset C_n \supset C_{n+1} \supset \cdots, </math>
it follows that▼
''it follows that''
:<math>\left(\bigcap_{k} C_k\right) \neq \emptyset. \, </math>▼
The result is typically used as a lemma in proving the [[Heine–Borel theorem]], which states that sets of real numbers are compact if and only if they are closed and bounded. Conversely, if the Heine–Borel theorem is known, then it can be restated as: a decreasing nested sequence of non-empty, compact subsets of '''R''' has nonempty intersection.▼
The closedness condition may be omitted in situations where every compact subset of <math>S</math> is closed, for example when <math>S</math> is [[Hausdorff space|Hausdorff]].
As an example, if ''C''<sub>''k''</sub> = [0, 1/''k''], the intersection over {''C''<sub>''k''</sub>} is {0}. On the other hand, both the sequence of open bounded sets ''C''<sub>''k''</sub> = (0, 1/''k'') and the sequence of unbounded closed sets ''C''<sub>''k''</sub> = [''k'', ∞) have empty intersection. All these sequences are properly nested.▼
'''Proof.''' Assume, by way of contradiction, that <math>{\textstyle \bigcap_{k = 0}^\infty C_k}=\emptyset</math>. For each <math>k</math>, let <math>U_k=C_0\setminus C_k</math>. Since <math>{\textstyle \bigcup_{k = 0}^\infty U_k}=C_0\setminus {\textstyle \bigcap_{k = 0}^\infty C_k}</math> and <math>{\textstyle \bigcap_{k = 0}^\infty C_k}=\emptyset</math>, we have <math>{\textstyle \bigcup_{k = 0}^\infty U_k}=C_0</math>. Since the <math>C_k</math> are closed relative to <math>S</math> and therefore, also closed relative to <math>C_0</math>, the <math>U_k</math>, their set complements in <math>C_0</math>, are open relative to <math>C_0</math>.
The theorem generalizes to '''R'''<sup>''n''</sup>, the set of ''n''-element vectors of real numbers, but does not generalize to arbitrary [[metric space]]s. For example, in the space of [[rational number]]s, the sets▼
Since <math>C_0\subset S</math> is compact and <math>\{U_k \vert k \geq 0\}</math> is an open cover (on <math>C_0</math>) of <math>C_0</math>, a finite cover <math>\{U_{k_1}, U_{k_2}, \ldots, U_{k_m}\}</math> can be extracted. Let <math>M=\max_{1\leq i\leq m} {k_i}</math>. Then <math>{\textstyle \bigcup_{i = 1}^m U_{k_i}}=U_M</math> because <math>U_1\subset U_2\subset\cdots\subset U_n\subset U_{n+1}\cdots</math>, by the nesting hypothesis for the collection <math>(C_k)_{k \geq 0}</math>. Consequently, <math>C_0={\textstyle \bigcup_{i = 1}^m U_{k_i}} = U_M</math>. But then <math>C_M=C_0\setminus U_M=\emptyset</math>, a contradiction. [[Q.E.D.|∎]]
==Statement for real numbers==
The theorem in real analysis draws the same conclusion for [[closed set|closed]] and [[bounded set|bounded]] subsets of the set of [[real number]]s <math>\mathbb{R}</math>. It states that a decreasing nested sequence <math>(C_k)_{k \geq 0}</math> of non-empty, closed and bounded subsets of <math>\mathbb{R}</math> has a non-empty intersection.
▲
▲As an example, if
▲
: <math>C_k = [\sqrt{2}, \sqrt{2}+1/k] = (\sqrt{2}, \sqrt{2}+1/k)</math>
are closed and bounded, but their intersection is empty.
Note that this contradicts neither the topological statement, as the sets <math>C_k</math> are not compact, nor the variant below, as the rational numbers are not complete with respect to the usual metric.
A simple corollary of the theorem is that the [[Cantor set]] is nonempty, since it is defined as the intersection of a decreasing nested sequence of sets, each of which is defined as the union of a finite number of closed intervals; hence each of these sets is non-empty, closed, and bounded. In fact, the Cantor set contains uncountably many points.
'''Theorem.''' ''Let'' <math>(C_k)_{k \geq 0}</math> ''be a sequence of non-empty, closed, and bounded subsets of'' <math>\mathbb{R}</math> ''satisfying''
== Proof ==▼
▲:<math>C_0 \
''Then,''
:<math>\bigcap_{k = 0}^\infty C_k \neq \emptyset. </math>
:
''Proof.'' Each nonempty, closed, and bounded subset <math>C_k\subset\mathbb{R}</math> admits a minimal element <math>x_k</math>. Since for each <math>k</math>, we have
:<math>x_{k+1} \in C_{k+1} \subset C_k</math>,
▲it follows that
:<math>x_k \le x_{k+1}</math>,
so <math>(x_k)_{k \geq 0}</math> is an increasing sequence contained in the bounded set <math>C_0</math>. The [[monotone convergence theorem]] for bounded sequences of real numbers now guarantees the existence of a [[Limit of a sequence|limit point]]
:<math>x=\lim_{k\to \infty} x_k.</math>
For fixed <math>k</math>, <math>x_j\in C_k</math> for all <math>j\geq k</math>, and since <math>C_k</math> is closed and <math>x</math> is a limit point, it follows that <math>x\in C_k</math>. Our choice of <math>k</math> is arbitrary, hence <math>x</math> belongs to <math>{\textstyle \bigcap_{k = 0}^\infty C_k}</math> and the proof is complete. ∎
== Variant in complete metric spaces ==
In a [[complete metric space]], the following variant of Cantor's intersection theorem holds.
'''Theorem.''' ''Suppose that <math>X</math> is a complete metric space, and <math>(C_k)_{k \geq 1}</math> is a sequence of non-empty closed nested subsets of <math>X</math> whose [[diameter]]s tend to zero:''
:<math>\lim_{k\to\infty} \operatorname{diam}(C_k) = 0,</math>
''where <math>\operatorname{diam}(C_k)</math> is defined by''
:<math>\operatorname{diam}(C_k) = \sup\{d(x,y) \mid x,y\in C_k\}.</math>
''Then the intersection of the <math>C_k</math> contains exactly one point:''
:<math>\bigcap_{k=1}^\infty C_k = \{x\}</math>
''for some <math>x \in X</math>.''
''Proof (sketch).'' Since the diameters tend to zero, the diameter of the intersection of the <math>C_k</math> is zero, so it is either empty or consists of a single point. So it is sufficient to show that it is not empty. Pick an element <math>x_k\in C_k</math> for each <math>k</math>. Since the diameter of <math>C_k</math> tends to zero and the <math>C_k</math> are nested, the <math>x_k</math> form a Cauchy sequence. Since the metric space is complete this Cauchy sequence converges to some point <math>x</math>. Since each <math>C_k</math> is closed, and <math>x</math> is a limit of a sequence in <math>C_k</math>, <math>x</math> must lie in <math>C_k</math>. This is true for every <math>k</math>, and therefore the intersection of the <math>C_k</math> must contain <math>x</math>. ∎
A converse to this theorem is also true: if <math>X</math> is a metric space with the property that the intersection of any nested family of non-empty closed subsets whose diameters tend to zero is non-empty, then <math>X</math> is a complete metric space. (To prove this, let <math>(x_k)_{k \geq 1}</math> be a Cauchy sequence in <math>X</math>, and let <math>C_k</math> be the closure of the tail <math>(x_j)_{j \geq k}</math> of this sequence.)
* [[Kuratowski's intersection theorem]]
* [[Helly's theorem]] - another theorem on intersection of sets.
== References ==
{{Reflist}}
* {{MathWorld | urlname=CantorsIntersectionTheorem | title=Cantor's Intersection Theorem}}
* Jonathan Lewin. An interactive introduction to mathematical analysis. Cambridge University Press. {{ISBN
[[Category:Articles containing proofs]]
[[Category:Real analysis]]
[[Category:
[[Category:Theorems in calculus]]
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