Help
Add this page to your book
Show book (0 pages)
Suggest pagesLebesgue's number lemma
From Wikipedia, the free encyclopedia
(Redirected from Lebesgue 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 (X, d) is compact and an open cover of X is given, then there exists a number δ > 0 such that every subset of X having diameter less than δ is contained in some member of the cover.
Such a number δ is called a Lebesgue number of this cover. The notion of a Lebesgue number itself is useful in other applications as well.
[edit] References
Munkres, James R. (1974), Topology: A first course, p. 179, ISBN 978-0139254956
[edit] External links
 |
This topology-related article is a stub. You can help Wikipedia by expanding it. |
