Cantor’s Intersection Theorem

Theorem 1.

Let $K_{1}\supset K_{2}\supset K_{3}\supset\ldots\supset K_{n}\supset\ldots$ be a sequence of non-empty, compact subsets of a metric space $X$ . Then the intersection $\bigcap_{i}K_{i}$ is not empty.

Proof.

Choose a point $x_{i}\in K_{i}$ for every $i=1,2,\ldots$ Since $x_{i}\in K_{i}\subset K_{1}$ is a sequence in a compact set, by Bolzano-Weierstrass Theorem, there exists a subsequence $x_{i_{j}}$ which converges to a point $x\in K_{1}$ . Notice, however, that for a fixed index $n$ , the sequence $x_{i_{j}}$ lies in $K_{n}$ for all $j$ sufficiently large (namely for all $j$ such that $i_{j}>n$ ). So one has $x\in K_{n}$ . Since this is true for every $n$ , the result follows. ∎

Title	Cantor’s Intersection Theorem
Canonical name	CantorsIntersectionTheorem
Date of creation	2013-03-22 15:12:35
Last modified on	2013-03-22 15:12:35
Owner	paolini (1187)
Last modified by	paolini (1187)
Numerical id	4
Author	paolini (1187)
Entry type	Theorem
Classification	msc 54E45