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- Szpilrajn_extension_theorem abstract "In mathematics, the Szpilrajn extension theorem, due to Edward Szpilrajn (1930) (later called Edward Marczewski), is one of many examples of the use of the axiom of choice (in the form of Zorn's lemma) to find a maximal set with certain properties.The theorem states that, given a binary relation R that is irreflexive and transitive it is always possible to find an extension of the relation (i.e. a relation T that strictly includes R) which is asymmetric, negatively transitive and connected.First of all, we need some definitions to be clear upon the terminology we will use speaking about relations with particular properties.".
- Szpilrajn_extension_theorem wikiPageExternalLink tresc.php?wyd=1&tom=16.
- Szpilrajn_extension_theorem wikiPageID "23874923".
- Szpilrajn_extension_theorem wikiPageRevisionID "584758291".
- Szpilrajn_extension_theorem authorlink "Edward Szpilrajn".
- Szpilrajn_extension_theorem first "Edward".
- Szpilrajn_extension_theorem hasPhotoCollection Szpilrajn_extension_theorem.
- Szpilrajn_extension_theorem last "Szpilrajn".
- Szpilrajn_extension_theorem year "1930".
- Szpilrajn_extension_theorem subject Category:Articles_containing_proofs.
- Szpilrajn_extension_theorem subject Category:Axiom_of_choice.
- Szpilrajn_extension_theorem subject Category:Theorems_in_the_foundations_of_mathematics.
- Szpilrajn_extension_theorem type Abstraction100002137.
- Szpilrajn_extension_theorem type Communication100033020.
- Szpilrajn_extension_theorem type Message106598915.
- Szpilrajn_extension_theorem type Proposition106750804.
- Szpilrajn_extension_theorem type Statement106722453.
- Szpilrajn_extension_theorem type Theorem106752293.
- Szpilrajn_extension_theorem type TheoremsInTheFoundationsOfMathematics.
- Szpilrajn_extension_theorem comment "In mathematics, the Szpilrajn extension theorem, due to Edward Szpilrajn (1930) (later called Edward Marczewski), is one of many examples of the use of the axiom of choice (in the form of Zorn's lemma) to find a maximal set with certain properties.The theorem states that, given a binary relation R that is irreflexive and transitive it is always possible to find an extension of the relation (i.e.".
- Szpilrajn_extension_theorem label "Satz von Marczewski-Szpilrajn".
- Szpilrajn_extension_theorem label "Szpilrajn extension theorem".
- Szpilrajn_extension_theorem label "Теорема Шпильрайна".
- Szpilrajn_extension_theorem sameAs Satz_von_Marczewski-Szpilrajn.
- Szpilrajn_extension_theorem sameAs 슈필라인_확장정리.
- Szpilrajn_extension_theorem sameAs m.076vpz5.
- Szpilrajn_extension_theorem sameAs Q869647.
- Szpilrajn_extension_theorem sameAs Q869647.
- Szpilrajn_extension_theorem sameAs Szpilrajn_extension_theorem.
- Szpilrajn_extension_theorem wasDerivedFrom Szpilrajn_extension_theorem?oldid=584758291.
- Szpilrajn_extension_theorem isPrimaryTopicOf Szpilrajn_extension_theorem.