tags:definition |topology
Closed Set
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Definition. (@Eck23, Definition 1.4, @Tu11 pp. 319) Let be a be a metric space (resp. topological space). A set is said to be closed in if its complement is open (resp. open) in .
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tags:definition |topology
Definition. (@Eck23, Definition 1.4, @Tu11 pp. 319) Let be a (X,d) be a metric space (resp. topological space). A set S⊂X is said to be closed in X if its complement X∖S is open (resp. open) in X.