Towers of torsors over a field

Abstract

Let X be a projective, connected and smooth scheme defined over an algebraically closed field k. In this paper we prove that a tower of finite torsors (i.e., under the action of finite k-group schemes) can be dominated by a single finite torsor. Let G be any finite k-group scheme and Y any G--torsor over X pointed in y\,∈\, Y(k); we define over Y, which may not be reduced, in a very natural way the categories of Nori-semistable and essentially finite vector bundles. These categories are proved to be Tannakian. Their Galois k-group schemes πS(Y,\,y) and πN(Y,\,y), respectively, thus generalize the S--fundamental and the Nori fundamental group schemes. The latter still classifies all the finite torsors over Y, pointed over y. We also prove that they fit in short exact sequences involving πS(X,\,x) and πN(X,\, x) respectively, where x is the image of y.