Lebesgue's number lemma

In topology, Lebesgue's number lemma, named after Henri Lebesgue, is a useful tool in the study of compact metric spaces. It states:

If the metric space is compact and an open cover of is given, then there exists a number such that every subset of having diameter less than is contained in some member of the cover.

Such a number is called a Lebesgue number of this cover. The notion of a Lebesgue number itself is useful in other applications as well.

Proof

Let be an open cover of . Since is compact we can extract a finite subcover .

For each , let and define a function by .

Since is continuous on a compact set, it attains a minimum . The key observation is that . If is a subset of of diameter less than , then there exist such that , where denotes the ball of radius centered at (namely, one can choose as any point in ). Since there must exist at least one such that . But this means that and so, in particular, .

References

Munkres, James R. (1974), Topology: A first course, p. 179, ISBN 978-0-13-925495-6 


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