\'Etale Reconstruction for Fp(t)-Schemes
Abstract
Voevodsky proved that normal schemes of finite type over finitely generated fields of characteristic 0 can be reconstructed from their \'etale sites. Let K be a field that is finitely generated over Fp(t). Grothendieck conjectured that perfections of finite type K-schemes can be reconstructed from their \'etale sites. Adapting Voevodsky's methods, we prove this.
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