Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q2862403> ?p ?o }
Showing triples 1 to 23 of
23
with 100 triples per page.
- Q2862403 subject Q6822339.
- Q2862403 subject Q8376892.
- Q2862403 abstract "In mathematics, the Schneider–Lang theorem is a refinement by Lang (1966) of a theorem of Schneider (1949) about the transcendence of values of meromorphic functions. The theorem implies both the Hermite–Lindemann and Gelfond–Schneider theorems, and implies the transcendence of some values of elliptic functions and elliptic modular functions.".
- Q2862403 wikiPageWikiLink Q1050230.
- Q2862403 wikiPageWikiLink Q11567.
- Q2862403 wikiPageWikiLink Q1572474.
- Q2862403 wikiPageWikiLink Q1726704.
- Q2862403 wikiPageWikiLink Q173091.
- Q2862403 wikiPageWikiLink Q176916.
- Q2862403 wikiPageWikiLink Q2036267.
- Q2862403 wikiPageWikiLink Q217616.
- Q2862403 wikiPageWikiLink Q2343600.
- Q2862403 wikiPageWikiLink Q287419.
- Q2862403 wikiPageWikiLink Q32229.
- Q2862403 wikiPageWikiLink Q616608.
- Q2862403 wikiPageWikiLink Q6822339.
- Q2862403 wikiPageWikiLink Q703577.
- Q2862403 wikiPageWikiLink Q8376892.
- Q2862403 wikiPageWikiLink Q847600.
- Q2862403 wikiPageWikiLink Q938102.
- Q2862403 wikiPageWikiLink Q976033.
- Q2862403 comment "In mathematics, the Schneider–Lang theorem is a refinement by Lang (1966) of a theorem of Schneider (1949) about the transcendence of values of meromorphic functions. The theorem implies both the Hermite–Lindemann and Gelfond–Schneider theorems, and implies the transcendence of some values of elliptic functions and elliptic modular functions.".
- Q2862403 label "Schneider–Lang theorem".