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- Q4830725 subject Q7139579.
- Q4830725 subject Q7451685.
- Q4830725 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.".
- Q4830725 wikiPageWikiLink Q1047547.
- Q4830725 wikiPageWikiLink Q1068976.
- Q4830725 wikiPageWikiLink Q123474.
- Q4830725 wikiPageWikiLink Q1668861.
- Q4830725 wikiPageWikiLink Q17099707.
- Q4830725 wikiPageWikiLink Q180907.
- Q4830725 wikiPageWikiLink Q182003.
- Q4830725 wikiPageWikiLink Q1857002.
- Q4830725 wikiPageWikiLink Q189156.
- Q4830725 wikiPageWikiLink Q1974793.
- Q4830725 wikiPageWikiLink Q215084.
- Q4830725 wikiPageWikiLink Q215111.
- Q4830725 wikiPageWikiLink Q229102.
- Q4830725 wikiPageWikiLink Q2370289.
- Q4830725 wikiPageWikiLink Q274808.
- Q4830725 wikiPageWikiLink Q428290.
- Q4830725 wikiPageWikiLink Q43260.
- Q4830725 wikiPageWikiLink Q467606.
- Q4830725 wikiPageWikiLink Q603880.
- Q4830725 wikiPageWikiLink Q648995.
- Q4830725 wikiPageWikiLink Q7139579.
- Q4830725 wikiPageWikiLink Q7451685.
- Q4830725 wikiPageWikiLink Q77141.
- Q4830725 wikiPageWikiLink Q836088.
- Q4830725 wikiPageWikiLink Q930734.
- Q4830725 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.".
- Q4830725 label "Ax–Grothendieck theorem".