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DBpedia 2014

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Fort_space abstract "In mathematics, Fort space, named after M. K. Fort, Jr., is an example in the theory of topological spaces.Let X be an infinite set of points, of which P is one. Then a Fort space is defined by X together with all subsets A such that:A excludes P, orA contains all but a finite number of the points of XX is homeomorphic to the one-point compactification of a discrete space.Modified Fort space is similar but has two particular points P and Q. So a subset is declared "open" if:A excludes P and Q, orA contains all but a finite number of the points of XFortissimo space is defined as follows. Let X be an uncountable set of points, of which P is one. A subset A is declared "open" if:A excludes P, orA contains all but a countable set of the points of X".
Fort_space wikiPageID "10105571".
Fort_space wikiPageRevisionID "507627786".
Fort_space hasPhotoCollection Fort_space.
Fort_space subject Category:Topological_spaces.
Fort_space subject Category:Topologies_on_the_set_of_positive_integers.
Fort_space type Abstraction100002137.
Fort_space type Attribute100024264.
Fort_space type Cognition100023271.
Fort_space type Content105809192.
Fort_space type Discipline105996646.
Fort_space type EarthScience106115476.
Fort_space type Geography106122178.
Fort_space type KnowledgeDomain105999266.
Fort_space type MathematicalSpace108001685.
Fort_space type NaturalScience106000400.
Fort_space type PsychologicalFeature100023100.
Fort_space type Science105999797.
Fort_space type Set107999699.
Fort_space type Space100028651.
Fort_space type Topography106122578.
Fort_space type TopologicalSpaces.
Fort_space type TopologiesOnTheSetOfPositiveIntegers.
Fort_space type Topology106122747.
Fort_space comment "In mathematics, Fort space, named after M. K. Fort, Jr., is an example in the theory of topological spaces.Let X be an infinite set of points, of which P is one. Then a Fort space is defined by X together with all subsets A such that:A excludes P, orA contains all but a finite number of the points of XX is homeomorphic to the one-point compactification of a discrete space.Modified Fort space is similar but has two particular points P and Q.".
Fort_space label "Fort space".
Fort_space sameAs m.02q1_l8.
Fort_space sameAs Q5472501.
Fort_space sameAs Q5472501.
Fort_space sameAs Fort_space.
Fort_space wasDerivedFrom Fort_space?oldid=507627786.
Fort_space isPrimaryTopicOf Fort_space.