Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q1691827> ?p ?o }
Showing triples 1 to 27 of
27
with 100 triples per page.
- Q1691827 subject Q8880669.
- Q1691827 abstract "In mathematics, especially in the areas of abstract algebra known as universal algebra, group theory, ring theory, and module theory, a subdirect product is a subalgebra of a direct product that depends fully on all its factors without however necessarily being the whole direct product. The notion was introduced by Birkhoff in 1944 and has proved to be a powerful generalization of the notion of direct product.".
- Q1691827 wikiPageWikiLink Q1208658.
- Q1691827 wikiPageWikiLink Q125977.
- Q1691827 wikiPageWikiLink Q1571290.
- Q1691827 wikiPageWikiLink Q159943.
- Q1691827 wikiPageWikiLink Q1617044.
- Q1691827 wikiPageWikiLink Q1636734.
- Q1691827 wikiPageWikiLink Q1778193.
- Q1691827 wikiPageWikiLink Q181296.
- Q1691827 wikiPageWikiLink Q18848.
- Q1691827 wikiPageWikiLink Q229102.
- Q1691827 wikiPageWikiLink Q2363730.
- Q1691827 wikiPageWikiLink Q245462.
- Q1691827 wikiPageWikiLink Q291126.
- Q1691827 wikiPageWikiLink Q2928101.
- Q1691827 wikiPageWikiLink Q395.
- Q1691827 wikiPageWikiLink Q5156434.
- Q1691827 wikiPageWikiLink Q538846.
- Q1691827 wikiPageWikiLink Q629933.
- Q1691827 wikiPageWikiLink Q7631005.
- Q1691827 wikiPageWikiLink Q834585.
- Q1691827 wikiPageWikiLink Q83478.
- Q1691827 wikiPageWikiLink Q874429.
- Q1691827 wikiPageWikiLink Q8880669.
- Q1691827 comment "In mathematics, especially in the areas of abstract algebra known as universal algebra, group theory, ring theory, and module theory, a subdirect product is a subalgebra of a direct product that depends fully on all its factors without however necessarily being the whole direct product. The notion was introduced by Birkhoff in 1944 and has proved to be a powerful generalization of the notion of direct product.".
- Q1691827 label "Subdirect product".