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- Ax–Grothendieck_theorem abstract "In mathematics, the Ax–Grothendieck theorem is a result about injectivity and surjectivity of polynomials that was proved independently by James Ax and Alexander Grothendieck.The theorem is often given as this special case: If P is a polynomial function from Cn to Cn and P is injective then P is bijective. That is, if P always maps distinct arguments to distinct values, then the values of P cover all of Cn.The full theorem generalizes to any algebraic variety over an algebraically closed field.".
- Ax–Grothendieck_theorem wikiPageID "21867395".
- Ax–Grothendieck_theorem wikiPageLength "6591".
- Ax–Grothendieck_theorem wikiPageOutDegree "26".
- Ax–Grothendieck_theorem wikiPageRevisionID "677877036".
- Ax–Grothendieck_theorem wikiPageWikiLink Alexander_Grothendieck.
- Ax–Grothendieck_theorem wikiPageWikiLink Algebraic_closure.
- Ax–Grothendieck_theorem wikiPageWikiLink Algebraic_variety.
- Ax–Grothendieck_theorem wikiPageWikiLink Algebraically_closed_field.
- Ax–Grothendieck_theorem wikiPageWikiLink Amenable_group.
- Ax–Grothendieck_theorem wikiPageWikiLink Analytic_function.
- Ax–Grothendieck_theorem wikiPageWikiLink Armand_Borel.
- Ax–Grothendieck_theorem wikiPageWikiLink Bijection.
- Ax–Grothendieck_theorem wikiPageWikiLink Bijective.
- Ax–Grothendieck_theorem wikiPageWikiLink Category:Model_theory.
- Ax–Grothendieck_theorem wikiPageWikiLink Category:Theorems_in_algebra.
- Ax–Grothendieck_theorem wikiPageWikiLink Cellular_automaton.
- Ax–Grothendieck_theorem wikiPageWikiLink Characteristic_(algebra).
- Ax–Grothendieck_theorem wikiPageWikiLink Finite_field.
- Ax–Grothendieck_theorem wikiPageWikiLink Finite_morphism.
- Ax–Grothendieck_theorem wikiPageWikiLink Garden_of_Eden_(cellular_automaton).
- Ax–Grothendieck_theorem wikiPageWikiLink Hilberts_Nullstellensatz.
- Ax–Grothendieck_theorem wikiPageWikiLink Homomorphism.
- Ax–Grothendieck_theorem wikiPageWikiLink Injective.
- Ax–Grothendieck_theorem wikiPageWikiLink Injective_function.
- Ax–Grothendieck_theorem wikiPageWikiLink Injectivity.
- Ax–Grothendieck_theorem wikiPageWikiLink James_Ax.
- Ax–Grothendieck_theorem wikiPageWikiLink Model_theory.
- Ax–Grothendieck_theorem wikiPageWikiLink Morphism_of_finite_type.
- Ax–Grothendieck_theorem wikiPageWikiLink Picard_theorem.
- Ax–Grothendieck_theorem wikiPageWikiLink Polynomial.
- Ax–Grothendieck_theorem wikiPageWikiLink Radicial_morphism.
- Ax–Grothendieck_theorem wikiPageWikiLink Surjective_function.
- Ax–Grothendieck_theorem wikiPageWikiLink Surjectivity.
- Ax–Grothendieck_theorem wikiPageWikiLink Éléments_de_géométrie_algébrique.
- Ax–Grothendieck_theorem wikiPageWikiLinkText "Ax–Grothendieck theorem".
- Ax–Grothendieck_theorem hasPhotoCollection Ax–Grothendieck_theorem.
- Ax–Grothendieck_theorem wikiPageUsesTemplate Template:Citation.
- Ax–Grothendieck_theorem wikiPageUsesTemplate Template:Reflist.
- Ax–Grothendieck_theorem subject Category:Model_theory.
- Ax–Grothendieck_theorem subject Category:Theorems_in_algebra.
- Ax–Grothendieck_theorem comment "In mathematics, the Ax–Grothendieck theorem is a result about injectivity and surjectivity of polynomials that was proved independently by James Ax and Alexander Grothendieck.The theorem is often given as this special case: If P is a polynomial function from Cn to Cn and P is injective then P is bijective. That is, if P always maps distinct arguments to distinct values, then the values of P cover all of Cn.The full theorem generalizes to any algebraic variety over an algebraically closed field.".
- Ax–Grothendieck_theorem label "Ax–Grothendieck theorem".
- Ax–Grothendieck_theorem sameAs Thxc3xa9orxc3xa8me_dAx-Grothendieck.
- Ax–Grothendieck_theorem sameAs משפט_אקס-גרותנדיק.
- Ax–Grothendieck_theorem sameAs アックス–グロタンディークの定理.
- Ax–Grothendieck_theorem sameAs m.05p9n52.
- Ax–Grothendieck_theorem sameAs Q4830725.
- Ax–Grothendieck_theorem sameAs Q4830725.
- Ax–Grothendieck_theorem wasDerivedFrom Ax–Grothendieck_theorem?oldid=677877036.
- Ax–Grothendieck_theorem isPrimaryTopicOf Ax–Grothendieck_theorem.