The Blaschke selection theorem is a result in topology and convex geometry about sequences of convex sets. Specifically, given a sequence of convex sets contained in a bounded set, the theorem guarantees the existence of a subsequence and a convex set such that converges to in the Hausdorff metric. The theorem is named for Wilhelm Blaschke.
Alternate statements
- A succinct statement of the theorem is that the metric space of convex bodies is locally compact.
- Using the Hausdorff metric on sets, every infinite collection of compact subsets of the unit ball has a limit point (and that limit point is itself a compact set).
Application
As an example of its use, the isoperimetric problem can be shown to have a solution.[1] That is, there exists a curve of fixed length that encloses the maximum area possible. Other problems likewise can be shown to have a solution:
- Lebesgue's universal covering problem for a convex universal cover of minimal size for the collection of all sets in the plane of unit diameter,[1]
- the maximum inclusion problem,[1]
- and the Moser's worm problem for a convex universal cover of minimal size for the collection of planar curves of unit length.[2]
Notes
References
- A. B. Ivanov (2001) [1994], "Blaschke selection theorem", Encyclopedia of Mathematics, EMS Press
- V. A. Zalgaller (2001) [1994], "Metric space of convex sets", Encyclopedia of Mathematics, EMS Press
- Kai-Seng Chou; Xi-Ping Zhu (2001). The Curve Shortening Problem. CRC Press. p. 45. ISBN 1-58488-213-1.
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