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- Baire category theorem [r]: Theorem that a complete metric space is of second category, equivalently, the intersection of any sequence of open dense sets in a complete metric space is dense. [e]
- Cantor set [r]: A fractal generated by starting with the interval [0,1] and removing the middle thirds of all the intervals at every iteration. [e]
- Denseness [r]: A set is dense in another set if the closure of the former set equals the latter set. [e]
- Interior (topology) [r]: The union of all open sets contained within a given subset of a topological space. [e]
- Baire category theorem [r]: Theorem that a complete metric space is of second category, equivalently, the intersection of any sequence of open dense sets in a complete metric space is dense. [e]
- Discrete metric [r]: The metric on a space which assigns distance one to any distinct points, inducing the discrete topology. [e]
- Indiscrete space [r]: A topological space in which the only open subsets are the empty set and the space itself [e]
- Category (disambiguation) [r]: Add brief definition or description