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Furthermore, initially working on topological vector spaces and analysis, Grothendieck then made revolutionary advances in algebraic geometry by developing sheaf and topos theory and abelian sheaf cohomology and formulating algebraic geometry in these terms (locally ringed spaces, schemes). This aspect of Alexandre Grothendieck Algebraic Geometry Topology Number plays a vital role in practical applications.
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Furthermore, initially working on topological vector spaces and analysis, Grothendieck then made revolutionary advances in algebraic geometry by developing sheaf and topos theory and abelian sheaf cohomology and formulating algebraic geometry in these terms (locally ringed spaces, schemes). This aspect of Alexandre Grothendieck Algebraic Geometry Topology Number plays a vital role in practical applications.
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