Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q5494135> ?p ?o }
Showing triples 1 to 18 of
18
with 100 triples per page.
- Q5494135 subject Q7036027.
- Q5494135 subject Q7215294.
- Q5494135 subject Q7451685.
- Q5494135 subject Q8880669.
- Q5494135 abstract "In mathematics, Fraïssé's theorem, named after Roland Fraïssé, states that a class K of finite relational structures is the age of a countable homogeneous relational structure if and only if it satisfies the following four conditions: K is closed under isomorphism; K is closed under taking induced substructures; K has only countably many members up to isomorphism; K has the amalgamation property.If these conditions hold, then the countable homogeneous structure whose age is K is unique up to isomorphism.Fraïssé proved the theorem in the 1950s.".
- Q5494135 wikiPageWikiLink Q1851710.
- Q5494135 wikiPageWikiLink Q185478.
- Q5494135 wikiPageWikiLink Q189112.
- Q5494135 wikiPageWikiLink Q2162753.
- Q5494135 wikiPageWikiLink Q217594.
- Q5494135 wikiPageWikiLink Q4691833.
- Q5494135 wikiPageWikiLink Q4739384.
- Q5494135 wikiPageWikiLink Q7036027.
- Q5494135 wikiPageWikiLink Q7215294.
- Q5494135 wikiPageWikiLink Q7451685.
- Q5494135 wikiPageWikiLink Q8880669.
- Q5494135 comment "In mathematics, Fraïssé's theorem, named after Roland Fraïssé, states that a class K of finite relational structures is the age of a countable homogeneous relational structure if and only if it satisfies the following four conditions: K is closed under isomorphism; K is closed under taking induced substructures; K has only countably many members up to isomorphism; K has the amalgamation property.If these conditions hold, then the countable homogeneous structure whose age is K is unique up to isomorphism.Fraïssé proved the theorem in the 1950s.".
- Q5494135 label "Fraïssé's theorem".