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- Cofiniteness abstract "In mathematics, a cofinite subset of a set X is a subset A whose complement in X is a finite set. In other words, A contains all but finitely many elements of X. If the complement is not finite, but it is countable, then one says the set is cocountable.These arise naturally when generalizing structures on finite sets to infinite sets, particularly on infinite products, as in the product topology or direct sum.".
- Cofiniteness wikiPageID "382708".
- Cofiniteness wikiPageLength "5696".
- Cofiniteness wikiPageOutDegree "47".
- Cofiniteness wikiPageRevisionID "587573439".
- Cofiniteness wikiPageWikiLink Algebraic_curve.
- Cofiniteness wikiPageWikiLink Base_(topology).
- Cofiniteness wikiPageWikiLink Basis_(topology).
- Cofiniteness wikiPageWikiLink Boolean_algebra_(structure).
- Cofiniteness wikiPageWikiLink Box_topology.
- Cofiniteness wikiPageWikiLink Category:Basic_concepts_in_infinite_set_theory.
- Cofiniteness wikiPageWikiLink Category:General_topology.
- Cofiniteness wikiPageWikiLink Cocountability.
- Cofiniteness wikiPageWikiLink Cocountable.
- Cofiniteness wikiPageWikiLink Cofinite_subset.
- Cofiniteness wikiPageWikiLink Cofiniteness.
- Cofiniteness wikiPageWikiLink Compact_set.
- Cofiniteness wikiPageWikiLink Compact_space.
- Cofiniteness wikiPageWikiLink Comparison_of_topologies.
- Cofiniteness wikiPageWikiLink Complement_(set_theory).
- Cofiniteness wikiPageWikiLink Counterexamples_in_Topology.
- Cofiniteness wikiPageWikiLink Direct_product.
- Cofiniteness wikiPageWikiLink Direct_sum_of_modules.
- Cofiniteness wikiPageWikiLink Discrete_space.
- Cofiniteness wikiPageWikiLink Dover_Publications.
- Cofiniteness wikiPageWikiLink Empty_set.
- Cofiniteness wikiPageWikiLink Even_number.
- Cofiniteness wikiPageWikiLink Field_(mathematics).
- Cofiniteness wikiPageWikiLink Hausdorff_space.
- Cofiniteness wikiPageWikiLink Hyperconnected_space.
- Cofiniteness wikiPageWikiLink Ideal_(order_theory).
- Cofiniteness wikiPageWikiLink Indiscrete_topology.
- Cofiniteness wikiPageWikiLink Irreducible_component.
- Cofiniteness wikiPageWikiLink Kolmogorov_space.
- Cofiniteness wikiPageWikiLink Mathematics.
- Cofiniteness wikiPageWikiLink Maximal_filter.
- Cofiniteness wikiPageWikiLink Normal_space.
- Cofiniteness wikiPageWikiLink Open_set.
- Cofiniteness wikiPageWikiLink Parity_(mathematics).
- Cofiniteness wikiPageWikiLink Polynomial.
- Cofiniteness wikiPageWikiLink Product_topology.
- Cofiniteness wikiPageWikiLink R0_space.
- Cofiniteness wikiPageWikiLink Regular_space.
- Cofiniteness wikiPageWikiLink Sequentially_compact.
- Cofiniteness wikiPageWikiLink Sequentially_compact_space.
- Cofiniteness wikiPageWikiLink Singleton_(mathematics).
- Cofiniteness wikiPageWikiLink Singleton_set.
- Cofiniteness wikiPageWikiLink Springer-Verlag.
- Cofiniteness wikiPageWikiLink Springer_Science+Business_Media.
- Cofiniteness wikiPageWikiLink Subbase.
- Cofiniteness wikiPageWikiLink Subset.
- Cofiniteness wikiPageWikiLink Subspace_topology.
- Cofiniteness wikiPageWikiLink T0_space.
- Cofiniteness wikiPageWikiLink T1_space.
- Cofiniteness wikiPageWikiLink T2_space.
- Cofiniteness wikiPageWikiLink Topological_indistinguishability.
- Cofiniteness wikiPageWikiLink Topological_product.
- Cofiniteness wikiPageWikiLink Topological_space.
- Cofiniteness wikiPageWikiLink Topologically_indistinguishable.
- Cofiniteness wikiPageWikiLink Trivial_topology.
- Cofiniteness wikiPageWikiLink Ultrafilter.
- Cofiniteness wikiPageWikiLink Zariski_topology.
- Cofiniteness wikiPageWikiLinkText "Cofiniteness".
- Cofiniteness wikiPageWikiLinkText "Cofiniteness#Cofinite topology".
- Cofiniteness hasPhotoCollection Cofiniteness.
- Cofiniteness wikiPageUsesTemplate Template:Citation.
- Cofiniteness wikiPageUsesTemplate Template:Distinguish.
- Cofiniteness subject Category:Basic_concepts_in_infinite_set_theory.
- Cofiniteness subject Category:General_topology.
- Cofiniteness hypernym Subset.
- Cofiniteness type Software.
- Cofiniteness type Concept.
- Cofiniteness type Thing.
- Cofiniteness comment "In mathematics, a cofinite subset of a set X is a subset A whose complement in X is a finite set. In other words, A contains all but finitely many elements of X. If the complement is not finite, but it is countable, then one says the set is cocountable.These arise naturally when generalizing structures on finite sets to infinite sets, particularly on infinite products, as in the product topology or direct sum.".
- Cofiniteness label "Cofiniteness".
- Cofiniteness differentFrom Cofinality.
- Cofiniteness sameAs Kofinite_Topologie.
- Cofiniteness sameAs Topología_cofinita.
- Cofiniteness sameAs Topologie_cofinie.
- Cofiniteness sameAs הטופולוגיה_הקו-סופית.
- Cofiniteness sameAs Topologia_cofinita.
- Cofiniteness sameAs 補有限.
- Cofiniteness sameAs 쌍대_유한_집합.
- Cofiniteness sameAs m.021tg2.
- Cofiniteness sameAs Kokonečná_podmnožina.
- Cofiniteness sameAs Tô_pô_phần_bù_hữu_hạn.
- Cofiniteness sameAs Q281212.
- Cofiniteness sameAs Q281212.
- Cofiniteness sameAs 餘有限空間.
- Cofiniteness wasDerivedFrom Cofiniteness?oldid=587573439.
- Cofiniteness isPrimaryTopicOf Cofiniteness.