Sur la cat\'egorie d\'eriv\'ee des faisceaux tordus
Abstract
Soit X un sch\'ema quasi-compact et s\'epar\'e et soit α∈ C2(X, OX*) un cocycle de Cech. Nous consid\'erons la cat\'egorie d\'eriv\'ee D(QCoh(X,α)) des faisceaux quasi-coh\'erents sur X tordu par α. Soit (X,α) la plus petite sous-cat\'egorie triangul\'ee de D(QCoh(X,α)) contenant tous les objets u* F, o\`u u:U X est une immersion ouverte avec U affine et F∈ D(QCoh(U,u*(α))). Alors, le but de cet article est de montrer que (X,α)=D(QCoh(X,α)). -- Let X be a quasi-compact and separated scheme and let α∈ C2(X, OX*) be a Cech cocycle. We consider the derived category D(QCoh(X,α)) of quasi-coherent sheaves on X twisted by α. Let (X,α) be the smallest triangulated subcategory of D(QCoh(X,α)) containing all the objects u* F, where u:U X is an open immersion with U affine and F∈ D(QCoh(U,u*(α))). Then, the purpose of this article is to show that (X,α)=D(QCoh(X,α)).
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