Abelian varieties are de Rham K(π,1)

Abstract

Motivated by the work of Esnault-Hai, one has the notion of de Rham K(π,1) schemes, defined as follows. Given a smooth proper geometrically connected scheme X over a field k of characteristic 0 and a base point x ∈ X (k), one can define its differential fundamental group πdiff(X/k), which comes from the Tannakian duality of the category of coherent integrable connections on X. Using the formalism of δ-functors, one can define natural morphisms between the group-scheme cohomology of πdiff(X/k) and the de Rham cohomology of X. One says that X with x∈ X(k) is de Rham K(π,1) if such morphisms are all isomorphisms. In this article, we first prove that abelian varieties in characteristic 0 are de Rham K(π,1). In the second part of the article, we study the group-scheme cohomology of the abelianization of the differential fundamental group of a smooth proper geometrically connected scheme via its Albanese variety.