A finiteness result on representations of Nori's fundamental group scheme
Abstract
Let (X,x) be a pointed geometrically connected smooth projective variety over a sub-p-adic field K. For any given rank n, we prove that there are only finitely many isomorphism classes of representations π1EF(X,x)→ GLn, where π1EF(X,x) is Nori's fundamental group of essentially finite bundles. Equivalently, there are only finitely many isomorphism classes of essentially finite bundles of rank n. This answers a question from C.Gasbarri.
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