DBpedia 2014 |

DBpedia 2014

Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Lusin's_separation_theorem> ?p ?o. }

Showing items 1 to 25 of 25 with 100 items per page.

Lusin's_separation_theorem abstract "In descriptive set theory and mathematical logic, Lusin's separation theorem states that if A and B are disjoint analytic subsets of Polish space, then there is a Borel set C in the space such that A ⊆ C and B ∩ C = ∅. It is named after Nikolai Luzin, who proved it in 1927.The theorem can be generalized to show that for each sequence (An) of disjoint analytic sets there is a sequence (Bn) of disjoint Borel sets such that An ⊆ Bn for each n.".
Lusin's_separation_theorem wikiPageExternalLink 1.
Lusin's_separation_theorem wikiPageExternalLink fm1011.pdf.
Lusin's_separation_theorem wikiPageID "30563979".
Lusin's_separation_theorem wikiPageRevisionID "553382705".
Lusin's_separation_theorem hasPhotoCollection Lusin's_separation_theorem.
Lusin's_separation_theorem subject Category:Descriptive_set_theory.
Lusin's_separation_theorem subject Category:Theorems_in_the_foundations_of_mathematics.
Lusin's_separation_theorem subject Category:Theorems_in_topology.
Lusin's_separation_theorem type Abstraction100002137.
Lusin's_separation_theorem type Communication100033020.
Lusin's_separation_theorem type Message106598915.
Lusin's_separation_theorem type Proposition106750804.
Lusin's_separation_theorem type Statement106722453.
Lusin's_separation_theorem type Theorem106752293.
Lusin's_separation_theorem type TheoremsInTheFoundationsOfMathematics.
Lusin's_separation_theorem type TheoremsInTopology.
Lusin's_separation_theorem comment "In descriptive set theory and mathematical logic, Lusin's separation theorem states that if A and B are disjoint analytic subsets of Polish space, then there is a Borel set C in the space such that A ⊆ C and B ∩ C = ∅. It is named after Nikolai Luzin, who proved it in 1927.The theorem can be generalized to show that for each sequence (An) of disjoint analytic sets there is a sequence (Bn) of disjoint Borel sets such that An ⊆ Bn for each n.".
Lusin's_separation_theorem label "Lusin's separation theorem".
Lusin's_separation_theorem sameAs m.0g9yndr.
Lusin's_separation_theorem sameAs Q6705124.
Lusin's_separation_theorem sameAs Q6705124.
Lusin's_separation_theorem sameAs Lusin's_separation_theorem.
Lusin's_separation_theorem wasDerivedFrom Lusin's_separation_theorem?oldid=553382705.
Lusin's_separation_theorem isPrimaryTopicOf Lusin's_separation_theorem.