Sur l'existence du sch\'ema en groupes fondamental

Abstract

Let S be a Dedekind scheme, X a connected S-scheme locally of finite type and x∈ X(S) a section. The aim of the present paper is to establish the existence of the fundamental group scheme of X, when X has reduced fibers or when X is normal. We also prove the existence of a group scheme, that we will call the quasi-finite fundamental group scheme of X at x, which classifies all the quasi-finite torsors over X, pointed over x. We define Galois torsors, which play in this context a role similar to the one of Galois covers in the theory of \'etale fundamental group.