A pro-algebraic fundamental group for topological spaces

Abstract

Consider a connected topological space X with a point x ∈ X and let K be a field with the discrete topology. We study the Tannakian category of finite dimensional (flat) vector bundles on X and its Tannakian dual πK (X,x) with respect to the fibre functor in x. The maximal pro-\'etale quotient of πK (X,x) is the \'etale fundamental group of X studied by Kucharczyk and Scholze. For well behaved topological spaces, πK (X,x) is the pro-algebraic completion of the ordinary fundamental group π1 (X,x). We obtain some structural results on πK (X,x) by studying (pseudo-)torsors attached to its quotients. This approach uses ideas of Nori in algebraic geometry and a result of Deligne on Tannakian categories. We also calculate πK (X,x) for some generalized solenoids.