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- Ax–Kochen_theorem 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.".
- Ax–Kochen_theorem wikiPageExternalLink books?id=MesICi8orQkC.
- Ax–Kochen_theorem wikiPageID "5911859".
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- Ax–Kochen_theorem wikiPageRevisionID "631037317".
- Ax–Kochen_theorem wikiPageWikiLink Acta_Arithmetica.
- Ax–Kochen_theorem wikiPageWikiLink Artin_conjecture.
- Ax–Kochen_theorem wikiPageWikiLink Artins_conjecture.
- Ax–Kochen_theorem wikiPageWikiLink Brauers_theorem_on_forms.
- Ax–Kochen_theorem wikiPageWikiLink C2_field.
- Ax–Kochen_theorem wikiPageWikiLink Category:Model_theory.
- Ax–Kochen_theorem wikiPageWikiLink Category:Theorems_in_number_theory.
- Ax–Kochen_theorem wikiPageWikiLink Characteristic_(algebra).
- Ax–Kochen_theorem wikiPageWikiLink Elsevier.
- Ax–Kochen_theorem wikiPageWikiLink Emil_Artin.
- Ax–Kochen_theorem wikiPageWikiLink Finite_field.
- Ax–Kochen_theorem wikiPageWikiLink Guy_Terjanian.
- Ax–Kochen_theorem wikiPageWikiLink Hensels_lemma.
- Ax–Kochen_theorem wikiPageWikiLink James_Ax.
- Ax–Kochen_theorem wikiPageWikiLink Jan_Denef.
- Ax–Kochen_theorem wikiPageWikiLink Jean-Louis_Colliot-Thélène.
- Ax–Kochen_theorem wikiPageWikiLink Laurent_series.
- Ax–Kochen_theorem wikiPageWikiLink Mathematical_logic.
- Ax–Kochen_theorem wikiPageWikiLink Model_theory.
- Ax–Kochen_theorem wikiPageWikiLink P-adic_number.
- Ax–Kochen_theorem wikiPageWikiLink Quasi-algebraic_closure.
- Ax–Kochen_theorem wikiPageWikiLink Quasi-algebraically_closed_field.
- Ax–Kochen_theorem wikiPageWikiLink Serge_Lang.
- Ax–Kochen_theorem wikiPageWikiLink Simon_B._Kochen.
- Ax–Kochen_theorem wikiPageWikiLink Ultraproduct.
- Ax–Kochen_theorem wikiPageWikiLink Valuation_(algebra).
- Ax–Kochen_theorem wikiPageWikiLinkText "''p''-adic counterexamples".
- Ax–Kochen_theorem wikiPageWikiLinkText "Ax–Kochen theorem".
- Ax–Kochen_theorem hasPhotoCollection Ax–Kochen_theorem.
- Ax–Kochen_theorem wikiPageUsesTemplate Template:Citation.
- Ax–Kochen_theorem wikiPageUsesTemplate Template:Cite_book.
- Ax–Kochen_theorem wikiPageUsesTemplate Template:Harvtxt.
- Ax–Kochen_theorem subject Category:Model_theory.
- Ax–Kochen_theorem subject Category:Theorems_in_number_theory.
- Ax–Kochen_theorem 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.".
- Ax–Kochen_theorem label "Ax–Kochen theorem".
- Ax–Kochen_theorem sameAs Thxc3xa9orxc3xa8me_dAx_et_Kochen.
- Ax–Kochen_theorem sameAs m.0fd5y9.
- Ax–Kochen_theorem sameAs Q3526976.
- Ax–Kochen_theorem sameAs Q3526976.
- Ax–Kochen_theorem wasDerivedFrom Ax–Kochen_theorem?oldid=631037317.
- Ax–Kochen_theorem isPrimaryTopicOf Ax–Kochen_theorem.