Reconstruction of schemes from their \'etale topoi
Abstract
Let k be a field that is finitely generated over its prime field. In Grothendieck's anabelian letter to Faltings, he conjectured that sending a k-scheme to its \'etale topos defines a fully faithful functor from the localization of the category of finite type k-schemes at the universal homeomorphisms to a category of topoi. We prove Grothendieck's conjecture for infinite fields of arbitrary characteristic. In characteristic 0, this shows that seminormal finite type k-schemes can be reconstructed from their \'etale topoi, generalizing work of Voevodsky. In positive characteristic, this shows that perfections of finite type k-schemes can be reconstructed from their \'etale topoi.
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