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- Compact_element abstract "In the mathematical area of order theory, the compact or finite elements of a partially ordered set are those elements that cannot be subsumed by a supremum of any non-empty directed set that does not already contain members above the compact element. Note that there are other notions of compactness in mathematics; also, the term "finite" in its normal set theoretic meaning does not coincide with the order-theoretic notion of a "finite element".".
- Compact_element wikiPageID "680261".
- Compact_element wikiPageLength "6294".
- Compact_element wikiPageOutDegree "34".
- Compact_element wikiPageRevisionID "543791197".
- Compact_element wikiPageWikiLink Category:Order_theory.
- Compact_element wikiPageWikiLink Compact_set.
- Compact_element wikiPageWikiLink Compact_space.
- Compact_element wikiPageWikiLink Compactness.
- Compact_element wikiPageWikiLink Complete_lattice.
- Compact_element wikiPageWikiLink Complete_partial_order.
- Compact_element wikiPageWikiLink Completeness_(order_theory).
- Compact_element wikiPageWikiLink Computer_science.
- Compact_element wikiPageWikiLink Congruence_relation.
- Compact_element wikiPageWikiLink DCPO.
- Compact_element wikiPageWikiLink Dcpo.
- Compact_element wikiPageWikiLink Directed_complete_partial_order.
- Compact_element wikiPageWikiLink Directed_set.
- Compact_element wikiPageWikiLink Domain_theory.
- Compact_element wikiPageWikiLink Empty_set.
- Compact_element wikiPageWikiLink Finite_set.
- Compact_element wikiPageWikiLink Greatest_element.
- Compact_element wikiPageWikiLink Ideal_(order_theory).
- Compact_element wikiPageWikiLink Infimum_and_supremum.
- Compact_element wikiPageWikiLink Least_element.
- Compact_element wikiPageWikiLink Mathematics.
- Compact_element wikiPageWikiLink Non-empty.
- Compact_element wikiPageWikiLink Open_set.
- Compact_element wikiPageWikiLink Order_theory.
- Compact_element wikiPageWikiLink Partially_ordered_set.
- Compact_element wikiPageWikiLink Power_set.
- Compact_element wikiPageWikiLink Real_number.
- Compact_element wikiPageWikiLink Semilattice.
- Compact_element wikiPageWikiLink Set_theory.
- Compact_element wikiPageWikiLink Subset.
- Compact_element wikiPageWikiLink Supremum.
- Compact_element wikiPageWikiLink Topological_space.
- Compact_element wikiPageWikiLink Universal_algebra.
- Compact_element wikiPageWikiLink Wiktionary:finite.
- Compact_element wikiPageWikiLinkText "Compact element".
- Compact_element wikiPageWikiLinkText "Compact element#Algebraic posets".
- Compact_element wikiPageWikiLinkText "Compact".
- Compact_element wikiPageWikiLinkText "algebraic lattice".
- Compact_element wikiPageWikiLinkText "algebraic".
- Compact_element wikiPageWikiLinkText "compact congruences".
- Compact_element wikiPageWikiLinkText "compact element".
- Compact_element wikiPageWikiLinkText "compact".
- Compact_element wikiPageWikiLinkText "compactly generated".
- Compact_element wikiPageWikiLinkText "compactness".
- Compact_element wikiPageWikiLinkText "congruence lattice".
- Compact_element hasPhotoCollection Compact_element.
- Compact_element wikiPageUsesTemplate Template:Unreferenced.
- Compact_element subject Category:Order_theory.
- Compact_element type Article.
- Compact_element type Article.
- Compact_element type Field.
- Compact_element comment "In the mathematical area of order theory, the compact or finite elements of a partially ordered set are those elements that cannot be subsumed by a supremum of any non-empty directed set that does not already contain members above the compact element. Note that there are other notions of compactness in mathematics; also, the term "finite" in its normal set theoretic meaning does not coincide with the order-theoretic notion of a "finite element".".
- Compact_element label "Compact element".
- Compact_element sameAs m.032c78.
- Compact_element sameAs Q5155306.
- Compact_element sameAs Q5155306.
- Compact_element sameAs 紧致元素.
- Compact_element wasDerivedFrom Compact_element?oldid=543791197.
- Compact_element isPrimaryTopicOf Compact_element.