Also known as topological dimension
invariant associated to a topological space; the smallest integer 𝑛 such that, for every cover, there is a refinement in which every point lies in the intersection of at most 𝑛+1 covering sets
数学の一分野、位相空間論におけるルベーグ被覆次元(ひふくじげん、英: Lebesgue covering dimension)あるいは位相次元(いそうじげん、英: topological dimension)は、位相空間に対して位相不変量となる次元の概念の(いくつかの同値でないものの)うちの一種である。
Abstract from DBpedia / Wikipedia · CC BY-SA
via Wikidata sitelinks · CC0
Discovered by embedding cosine similarity (sentence-transformers MiniLM, 384-dim).