Kuratowski's closure-complement problem
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In the mathematical subject of topology, Kuratowski's closure-complement problem is the question how many distinct sets can be obtained by repeatedly applying the set operations of closure and complement to a given starting subset of a topological space. The answer is: no more than 14. This result was first published by Kazimierz Kuratowski in 1922. It follows easily from the following facts that hold for any subsets S of a space, writing S^ for the closure of S, So for the interior of S, and S' for its complement:
(1) S^ ^ = S^
(2) S‘‘ = S
(3) S^ ' ^ ' ^ ' ^ = S^ ' ^
The first two are trivial. (3) follows easily from the fact that So ^ o ^ = So ^ (together with the triviality that So = S‘ ^ ‘ ).
Many variations have appeared since, especially after 1960.
A subset realizing the maximum of 14 is called a 14-set. The real numbers in their standard topology have subsets that are 14-sets. One such subset is:
![(0,1) \cup(1,2)\cup\{3\}\cup\bigl([4,5]\cap\Q\bigr),](/wiki/images/math/3/a/1/3a1bef12b3d04c9822e257c0d857241f.png)
where (0,1) and (1,2) denote open intervals and [4,5] denotes a closed interval.
[edit] References
- Kelley, J. L. General Topology. Princeton: Van Nostrand, p. 57, 1955.
- Kuratowski, K. Sur l'operation A de l'analysis situs. Fund. Math. 3, 182-199, 1922.
[edit] External links
[http://www.latrobe.edu.au/mathstats/department/algebra-research-group/Papers/GJ_Kuratowski.pdf The Kuratowski Closure-Complement Problem] by B.J. Gardner and Marcel Jackson
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