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One of the ways the Arzela-Ascoli Theorem is stated is as follows:

Given a compact space $X$ and a set $ M \subset C(X) := \{f: X \rightarrow \mathbb{R}, \| . \|_{\infty}\}$, the following are equivalent:

1) $M$ is bounded, closed and uniformly equicontinuous.
2) $M$ compact.

Why is the condition on boundedness required, and does it not follow from uniform equicontinuity? It appears to me that uniform equicontinuity implies (pointwise) continuity of any function $f$ in $M$, and since $X$ is compact and $f$ is continuous, $f(X)$ is compact so $f$ takes its maximum and minimum on its image. In particular, it would follow that $\| f\|_{\infty} < \infty$, for every $f \in M$, so $M$ is bounded. Since the theorem is well-established, it seems to me that there must be some mistake in this argument.

  • 0
    It does appears that if $V$ is connected, and there is a point $x \in V$ such that $\{ f(x) | f\in M \}$ is bounded, then M is bounded. This is an exercise I am currently stuck on.2012-11-22

3 Answers 3

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You are right: If $f \in C(X)$, then $f$ is bounded. But: $M$ bounded means

$\sup_{f \in M} \|f\|_{\infty}<\infty$

... and this condition is not necessarily fulfulled if every function in $M$ is bounded.

Example: Let $f_n(x) := n$, then $f_n$ is continuous and bounded, but $M := \{f_n;n \in \mathbb{N}\}$ is not bounded.

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The subset of constant functions is closed and equicontiuous, but not compact. Your mistake was to conclude from bounded functions to a bounded set of bounded functions...

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Generally, compactness of $M$ is proven by showing that it is sequentially compact. In proving this, you need to take a sequence of functions in $M$, and although each one may be bounded, they might not be bounded by the same bound. Read any proof and you will see that it is important that they are uniformly bounded.