Extention of Finite Solvable Torsors over a Curve

Abstract

Let R be a discrete valuation ring with fraction field K and with algebraically closed residue field of positive characteristic p. Let X be a smooth fibered surface over R with geometrically connected fibers endowed with a section x∈ X(R). Let G be a finite solvable K-group scheme and assume that either |G|=pn or G has a normal series of length 2. We prove that every quotient pointed G-torsor over the generic fiber Xη of X can be extended to a torsor over X after eventually extending scalars and after eventually blowing up X at a closed subscheme of its special fiber Xs.