A criterion for solving embedding problems for the etale fundamental group of curves

Abstract

Let C be an affine curve over an algebraically closed field k of characteristic p>0. Given an embedding problem (β: G, α: πet1(C) G) for π1et(C) where β is a surjective homomorphism of finite groups with prime-to-p kernel H, we discuss when an H-cover of the G-cover of C corresponding to α is a solution. When H is abelian and G is a p-group, some necessary and sufficient conditions for the solvability of the embedding problem are given in terms of the action of G on certain generalized Picard group.