Extension of torsors and prime to p fundamental group scheme

Abstract

Let R be a discrete valuation ring with fraction field K. Let X be a proper and faithfully flat R-scheme, endowed with a section x ∈ X(R), with connected and reduced generic fibre Xη. Let f: Y → Xη be a finite Nori-reduced G-torsor. In this paper we provide a useful criterion to extend f: Y → Xη to a torsor over X. Furthermore in the particular situation where R is a complete discrete valuation ring of residue characteristic p>0 and X Spec(R) is smooth we apply our criterion to prove that the natural morphism (p'): π(Xη,xη)(p') π(X,x)η(p') between the prime-to-p fundamental group scheme of Xη and the generic fibre of the prime-to-p fundamental group scheme of X is an isomorphism. This generalizes a well known result for the \'etale fundamental group. The methods used are purely tannakian.