Connections and genuinely ramified maps of curves

Abstract

Given a singular connection D on a vector bundle E over an irreducible smooth projective curve X, defined over an algebraically closed field, we show that there is a unique maximal subsheaf of E on which D induces a nonsingular connection. Given a generically smooth map φ : Y →\ X between irreducible smooth projective curves, and a singular connection (V, D) on Y, the direct image φ*V has a singular connection. Let R(φ* OY) be the unique maximal subsheaf on which the singular connection on φ* OY -- corresponding to the trivial connection on OY -- induces a nonsingular connection. We prove that the homomorphism of \'etale fundamental groups φ*: π1 et(Y, y0) → π1 et(X, φ(y0)) induced by φ is surjective if and only if OX ⊂ R(φ* OY) is the unique maximal semistable subsheaf. When the characteristic of the base field is zero, this homomorphism φ* is surjective if and only if OX = R(φ* OY). For any nonsingular connection D on a vector bundle V over X, there is a natural map V R(φ*φ*V). When the characteristic of the base field is zero, we prove that the map φ is genuinely ramified if and only if V = R(φ*φ*V).