On the proalgebraic fundamental group of topological spaces and amalgamated products of affine group schemes

Abstract

The proalgebraic fundamental group of a connected topological space X, recently introduced by the first author, is an affine group scheme whose representations classify local systems of finite-dimensional vector spaces on X. In this article, we further develop the theory of the proalgebraic fundamental group, in particular, we establish homotopy invariance and a Seifert-van Kampen theorem. To facilitate the latter, we study amalgamated free product of affine group schemes. We also compute the proalgebraic fundamental group of the arithmetically relevant Kucharcyzk-Scholze spaces and compare it to the motivic Galois group.