Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q17099374> ?p ?o }
Showing triples 1 to 18 of
18
with 100 triples per page.
- Q17099374 subject Q15206900.
- Q17099374 abstract "In mathematics, the Neukirch–Uchida theorem shows that all problems about algebraic number fields can be reduced to problems about their absolute Galois groups.Neukirch (1969) showed that two algebraic number fields with the same absolute Galois group are isomorphic, and Uchida (1977) strengthened this by proving Neukirch's conjecture that automorphisms of the algebraic number field correspond to outer automorphisms of its absolute Galois group. Florian Pop extended the result to infinite fields that are finitely generated over prime fields.The Neukirch–Uchida theorem is one of the foundational results of anabelian geometry, whose main theme is to reduce properties of geometric objects to properties of their fundamental groups, provided these fundamental groups are sufficiently non-abelian.".
- Q17099374 wikiPageExternalLink purl?PPN243919689_0238.
- Q17099374 wikiPageWikiLink Q1368270.
- Q17099374 wikiPageWikiLink Q15206900.
- Q17099374 wikiPageWikiLink Q189112.
- Q17099374 wikiPageWikiLink Q2835968.
- Q17099374 wikiPageWikiLink Q32229.
- Q17099374 wikiPageWikiLink Q325131.
- Q17099374 wikiPageWikiLink Q332407.
- Q17099374 wikiPageWikiLink Q3630548.
- Q17099374 wikiPageWikiLink Q395.
- Q17099374 wikiPageWikiLink Q483270.
- Q17099374 wikiPageWikiLink Q616608.
- Q17099374 wikiPageWikiLink Q662830.
- Q17099374 wikiPageWikiLink Q836088.
- Q17099374 comment "In mathematics, the Neukirch–Uchida theorem shows that all problems about algebraic number fields can be reduced to problems about their absolute Galois groups.Neukirch (1969) showed that two algebraic number fields with the same absolute Galois group are isomorphic, and Uchida (1977) strengthened this by proving Neukirch's conjecture that automorphisms of the algebraic number field correspond to outer automorphisms of its absolute Galois group.".
- Q17099374 label "Neukirch–Uchida theorem".