Extended Picard complexes and linear algebraic groups

Abstract

For a smooth geometrically integral variety X over a field k of characteristic 0, we introduce and investigate the extended Picard complex UPic(X). It is a certain complex of Galois modules of length 2, whose zeroth cohomology is k[X]*/ k* and whose first cohomology is Pic(X), where k is a fixed algebraic closure of k and X is obtained from X by extension of scalars to k. When X is a k-torsor of a connected linear k-group G, we compute UPic(X)=UPic(G) (in the derived category) in terms of the algebraic fundamental group π1(G). As an application we compute the elementary obstruction for such X.

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