Class field theory for function fields and finite abelian torsors

Abstract

Let U be a smooth and connected curve over an algebraically closed field of positive characteristic, with smooth compactification X. We generalize classical Geometric Class Field theory to provide a classification of fppf G-torsors over U in terms of isogenies of generalized Jacobians, for any finite abelian group scheme G. We then apply this classification to give a novel description of the abelianized Nori fundamental group scheme of U in terms of the Serre--Oort fundamental groups of generalized Jacobians of X; when U=X is projective, we recover a well known description of the abelianized fundamental group scheme of X as the projective limit of all torsion subgroup schemes of its Jacobian.