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Heine–Cantor theorem - Wikipedia, the free encyclopedia

Heine–Cantor theorem

From Wikipedia, the free encyclopedia

In mathematics, the Heine–Cantor theorem, named after Eduard Heine and Georg Cantor, states that if M is a compact metric space, then every continuous function

f : M → N,

where N is a metric space, is uniformly continuous.

For instance, if f : [a,b] → R is a continuous function, then it is uniformly continuous.

This is not Cantor's theorem.

[edit] Proof

Suppose that f is continuous on a compact metric space M but not uniformly continuous, then the negation of

$\forall \varepsilon > 0 \quad \exists \delta > 0$ such that $d(x,y) < \delta \Rightarrow \rho (f(x) , f(y) ) < \varepsilon$ for all x, y in M

is:

$\exists \varepsilon_0 > 0$ such that $\forall \delta > 0 , \ \exists x, y \in M$ such that $\ d(x,y) < \delta$ and $\rho (f(x) , f(y) ) \ge \varepsilon_0$ .

where d and $ρ$ are the distance functions on metric spaces M and N, respectively.

Choose two sequences x_n and y_n such that

$d(x_n, y_n) < \frac {1}{n}$

as the metric space is compact there exists two converging subsequences ( $x_{n_k}$ to x₀ and $y_{n_k}$ to y₀), so

$d(x_{n_k}, y_{n_k}) < n_k \Rightarrow \rho ( f (x_{n_k}), f (y_{n_k})) \ge \varepsilon_0$

but as f is continuous and $x_{n_k}$ and $y_{n_k}$ converge to the same point, this statement is impossible.

[edit] See also

Georg Cantor

[edit] External links

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