On iterated universal extensions and Nori's fundamental group of nilpotent bundles

Abstract

Let k be a field of characteristic 0, X be a geometrically connected, smooth and proper variety over k and x∈ X(k) be a base point. Using the notion of iterated universal extensions, we show that Nori's fundamental group π1N(X,x) of nilpotent bundles is uniquely determined by the coherent cohomology groups Hi(X)=Hi(X,OX), i=1,2, and the cup product : H1(X)1(X) → H2(X). This can be seen as an analogue of a classical fact on the de Rham fundamental group of compact K\"ahler manifolds. As a byproduct, we also determine low degree group cohomology of the trivial representation of π1N(X,x), notably in degree 2.

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