Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Divisibility_(ring_theory)> ?p ?o }
Showing triples 1 to 49 of
49
with 100 triples per page.
- Divisibility_(ring_theory) abstract "In mathematics, the notion of a divisor originally arose within the context of arithmetic of whole numbers. See the article on divisors for this simplest example. With the development of abstract rings, of which the integers are the archetype, the original notion of divisor found a natural extension.Divisibility is a useful concept for the analysis of the structure of commutative rings because of its relationship with the ideal structure of such rings.".
- Divisibility_(ring_theory) wikiPageExternalLink books?id=STS9aZ6F204C.
- Divisibility_(ring_theory) wikiPageID "32981716".
- Divisibility_(ring_theory) wikiPageLength "3862".
- Divisibility_(ring_theory) wikiPageOutDegree "24".
- Divisibility_(ring_theory) wikiPageRevisionID "644750644".
- Divisibility_(ring_theory) wikiPageWikiLink Archetype.
- Divisibility_(ring_theory) wikiPageWikiLink Category:Ring_theory.
- Divisibility_(ring_theory) wikiPageWikiLink Commutative_ring.
- Divisibility_(ring_theory) wikiPageWikiLink Disjoint_sets.
- Divisibility_(ring_theory) wikiPageWikiLink Divisor.
- Divisibility_(ring_theory) wikiPageWikiLink Equivalence_class.
- Divisibility_(ring_theory) wikiPageWikiLink Equivalence_relation.
- Divisibility_(ring_theory) wikiPageWikiLink GCD_domain.
- Divisibility_(ring_theory) wikiPageWikiLink Ideal_(ring_theory).
- Divisibility_(ring_theory) wikiPageWikiLink Integer.
- Divisibility_(ring_theory) wikiPageWikiLink Integral_domain.
- Divisibility_(ring_theory) wikiPageWikiLink Magma_(algebra).
- Divisibility_(ring_theory) wikiPageWikiLink Magma_(mathematics).
- Divisibility_(ring_theory) wikiPageWikiLink Mathematics.
- Divisibility_(ring_theory) wikiPageWikiLink Monoid.
- Divisibility_(ring_theory) wikiPageWikiLink Multiple_(mathematics).
- Divisibility_(ring_theory) wikiPageWikiLink Principal_ideal.
- Divisibility_(ring_theory) wikiPageWikiLink Ring_(mathematics).
- Divisibility_(ring_theory) wikiPageWikiLink Springer-Verlag.
- Divisibility_(ring_theory) wikiPageWikiLink Springer_Science+Business_Media.
- Divisibility_(ring_theory) wikiPageWikiLink Unit_(ring_theory).
- Divisibility_(ring_theory) wikiPageWikiLink Valuation_ring.
- Divisibility_(ring_theory) wikiPageWikiLink Zero_divisor.
- Divisibility_(ring_theory) wikiPageWikiLinkText "Divisibility (ring theory)".
- Divisibility_(ring_theory) wikiPageWikiLinkText "associate".
- Divisibility_(ring_theory) wikiPageWikiLinkText "divide".
- Divisibility_(ring_theory) wikiPageWikiLinkText "divides".
- Divisibility_(ring_theory) wikiPageWikiLinkText "divisibility (ring theory)".
- Divisibility_(ring_theory) wikiPageWikiLinkText "divisibility".
- Divisibility_(ring_theory) wikiPageWikiLinkText "divisor".
- Divisibility_(ring_theory) hasPhotoCollection Divisibility_(ring_theory).
- Divisibility_(ring_theory) wikiPageUsesTemplate Template:Citation.
- Divisibility_(ring_theory) wikiPageUsesTemplate Template:Citizendium.
- Divisibility_(ring_theory) wikiPageUsesTemplate Template:Reflist.
- Divisibility_(ring_theory) subject Category:Ring_theory.
- Divisibility_(ring_theory) comment "In mathematics, the notion of a divisor originally arose within the context of arithmetic of whole numbers. See the article on divisors for this simplest example. With the development of abstract rings, of which the integers are the archetype, the original notion of divisor found a natural extension.Divisibility is a useful concept for the analysis of the structure of commutative rings because of its relationship with the ideal structure of such rings.".
- Divisibility_(ring_theory) label "Divisibility (ring theory)".
- Divisibility_(ring_theory) sameAs Divisibilité.
- Divisibility_(ring_theory) sameAs m.0h51pc3.
- Divisibility_(ring_theory) sameAs Q5284415.
- Divisibility_(ring_theory) sameAs Q5284415.
- Divisibility_(ring_theory) wasDerivedFrom Divisibility_(ring_theory)?oldid=644750644.
- Divisibility_(ring_theory) isPrimaryTopicOf Divisibility_(ring_theory).