Effective models and extension of torsors over a discrete valuation ring of unequal characteristic

Abstract

Let R be a discrete valuation ring of unequal characteristic with fraction field K which contains a primitive p2-th root of unity. Let X be a faithfully flat R-scheme and G be a finite abstract group. Let us consider a G-torsor YK XK and let Y be the normalization of XK in Y. If G=Z/pn Z, n<3, under some hypothesis on X, we attach some invariants to YK XK. If p>2, we determine, through these invariants, when Y X has a structure of torsor which extends that of YK XK. Moreover we explicitly calculate the effective model (defined by Romagny) of the action of G on Y.