Separation axioms/Related Articles: Difference between revisions

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Cocountable topology [r]: The topology on a space in which the open sets are those with countable complements, or the empty set. ^[e]
Cofinite topology [r]: The topology on a space in which the open sets are those with finite complement, or the empty set. ^[e]
Separability (topology) [r]: Add brief definition or description
Topological space [r]: A mathematical structure (generalizing some aspects of Euclidean space) defined by a family of open sets. ^[e]
Uniform space [r]: Topological space with additional structure which is used to define uniform properties such as completeness, uniform continuity and uniform convergence. ^[e]

Ring (mathematics) [r]: Algebraic structure with two operations, combining an abelian group with a monoid. ^[e]
Open cover [r]: Add brief definition or description
Indiscrete space [r]: A topological space in which the only open subsets are the empty set and the space itself ^[e]
Extreme value [r]: The largest and the smallest element of a set. ^[e]
Point (geometry) [r]: An object that has a position but no length, breadth or depth. ^[e]

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+==Articles related by keyphrases (Bot populated)==
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+{{r|Extreme value}}
+{{r|Point (geometry)}}