The Base Change Of Fundamental Group Schemes

Abstract

Let k be a field, K/k a field extension, X a connected scheme proper over k, xK∈ XK(K) lying over x∈ X(k), CX and CXK the Tannakian categories whose objects consist of vector bundles on X and XK respectively, π(CX,x) and π(CXK,xK) the corresponding Tannaka group schemes respectively. We establish a unified criterion determining when the base change homomorphism π(CXK,xK)→ π(CX,x)K is faithfully flat or an isomorphism. As applications, we recover and generalize base change results for the S, Nori, EN, F, EF, ét, Eét, Loc, ELoc, and unipotent-fundamental group schemes under different types of field extensions (e.g., separable, finite Galois, and algebraically closed extensions). Moreover, our approach provides a unified explanation for both positive and negative results, including previously known counterexamples.