toIPA
Home
Blog
Category
Kuratowski's closure-complement problem
theorem that the monoid generated by taking closures and complements of a given set in a topological space has size at most 14, attained by e.g. the set (0, 1) ∪ (1, 2) ∪ {3} ∪ ([4, 5] ∩ ℚ) of reals
Pronunciation
/Kuratowski's ˈkloʊʒər - ˈkɑmpləmənt ˈprɑbləm/
/Kuratowski's ˈkləʊʒə - ˈkɒmplɪmənt ˈprɒbləm/
Categories
mathematical problem
theorem