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- Q3526976 subject Q7139612.
- Q3526976 subject Q7451685.
- Q3526976 abstract "The Ax–Kochen theorem, named for James Ax and Simon B. Kochen, states that for each positive integer d there is a finite set Yd of prime numbers, such that if p is any prime not in Yd then every homogeneous polynomial of degree d over the p-adic numbers in at least d2+1 variables has a nontrivial zero.".
- Q3526976 wikiPageExternalLink books?id=MesICi8orQkC.
- Q3526976 wikiPageWikiLink Q1166618.
- Q3526976 wikiPageWikiLink Q1247766.
- Q3526976 wikiPageWikiLink Q1424496.
- Q3526976 wikiPageWikiLink Q1513086.
- Q3526976 wikiPageWikiLink Q1535225.
- Q3526976 wikiPageWikiLink Q1681710.
- Q3526976 wikiPageWikiLink Q283684.
- Q3526976 wikiPageWikiLink Q311627.
- Q3526976 wikiPageWikiLink Q343132.
- Q3526976 wikiPageWikiLink Q371948.
- Q3526976 wikiPageWikiLink Q425432.
- Q3526976 wikiPageWikiLink Q467606.
- Q3526976 wikiPageWikiLink Q4958219.
- Q3526976 wikiPageWikiLink Q5622635.
- Q3526976 wikiPageWikiLink Q57283.
- Q3526976 wikiPageWikiLink Q603880.
- Q3526976 wikiPageWikiLink Q7139612.
- Q3526976 wikiPageWikiLink Q7451685.
- Q3526976 wikiPageWikiLink Q746413.
- Q3526976 wikiPageWikiLink Q836088.
- Q3526976 wikiPageWikiLink Q852757.
- Q3526976 wikiPageWikiLink Q930734.
- Q3526976 comment "The Ax–Kochen theorem, named for James Ax and Simon B. Kochen, states that for each positive integer d there is a finite set Yd of prime numbers, such that if p is any prime not in Yd then every homogeneous polynomial of degree d over the p-adic numbers in at least d2+1 variables has a nontrivial zero.".
- Q3526976 label "Ax–Kochen theorem".