Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q151208> ?p ?o }
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- Q151208 subject Q7003933.
- Q151208 subject Q7215294.
- Q151208 subject Q7217289.
- Q151208 subject Q7217333.
- Q151208 subject Q8234869.
- Q151208 subject Q8911731.
- Q151208 abstract "In mathematics, more precisely in algebra, a prosolvable group (less common: prosoluble group) is a group that is isomorphic to the inverse limit of an inverse system of solvable groups. Equivalently, a group is called prosolvable, if, viewed as a topological group, every open neighborhood of the identity contains a normal subgroup whose corresponding quotient group is a solvable group.".
- Q151208 wikiPageWikiLink Q1046291.
- Q151208 wikiPageWikiLink Q1138961.
- Q151208 wikiPageWikiLink Q189112.
- Q151208 wikiPageWikiLink Q190109.
- Q151208 wikiPageWikiLink Q2020004.
- Q151208 wikiPageWikiLink Q245462.
- Q151208 wikiPageWikiLink Q2478475.
- Q151208 wikiPageWikiLink Q2634828.
- Q151208 wikiPageWikiLink Q291126.
- Q151208 wikiPageWikiLink Q311627.
- Q151208 wikiPageWikiLink Q395.
- Q151208 wikiPageWikiLink Q3968.
- Q151208 wikiPageWikiLink Q428290.
- Q151208 wikiPageWikiLink Q49008.
- Q151208 wikiPageWikiLink Q6060434.
- Q151208 wikiPageWikiLink Q7003933.
- Q151208 wikiPageWikiLink Q7215294.
- Q151208 wikiPageWikiLink Q7217289.
- Q151208 wikiPageWikiLink Q7217333.
- Q151208 wikiPageWikiLink Q730384.
- Q151208 wikiPageWikiLink Q743179.
- Q151208 wikiPageWikiLink Q759832.
- Q151208 wikiPageWikiLink Q8234869.
- Q151208 wikiPageWikiLink Q83478.
- Q151208 wikiPageWikiLink Q8911731.
- Q151208 wikiPageWikiLink Q92552.
- Q151208 comment "In mathematics, more precisely in algebra, a prosolvable group (less common: prosoluble group) is a group that is isomorphic to the inverse limit of an inverse system of solvable groups. Equivalently, a group is called prosolvable, if, viewed as a topological group, every open neighborhood of the identity contains a normal subgroup whose corresponding quotient group is a solvable group.".
- Q151208 label "Prosolvable group".