Ramified covering maps of singular curves and stability of pulled back bundles

Abstract

Let f : X → Y be a generically smooth nonconstant morphism between irreducible projective curves, defined over an algebraically closed field, which is \'etale on an open subset of Y that contains both the singular locus of Y and the image, in Y, of the singular locus of X. We prove that the following statements are equivalent: enumerate The homomorphism of \'etale fundamental groups f* : π1 et(X) →π1 et(Y) induced by f is surjective. There is no nontrivial \'etale covering φ : Y' → Y admitting a morphism q: X → Y' such that φ q = f. The fiber product X×Y X is connected. H0(X, f*f* OX)= 1. OY ⊂ f* OX is the maximal semistable subsheaf. The pullback f*E of every stable sheaf E on Y is also stable. enumerate