On the Tschirnhausen module of coverings of curves on decomposable ruled surfaces and applications

Abstract

We show that for two classes of m-secant curves X ⊂ S, with m ≥ 2, where f : S = P (OY OY (E)) Y and E is a non-special divisor on a smooth curve Y, the Tschirnhausen module E of the covering = f|X : X Y decomposes completely as a direct sum of line bundles. Specifically, we prove that: for X ∈ |OS (mH)|, where H denotes the tautological divisor on S, one has E OY (-E) ·s OY (-(m-1)E) ; for X ∈ |OS (mH + fq))|, where q is a point on Y, E OY (-E-q) ·s OY (-(m-1)E-q) holds. This decomposition enables us to compute the dimension of the space of global sections of the normal bundle of the embedding X ⊂ PR induced by the tautological line bundle |OS (H)|, where R = |OS (H)|. As an application, we construct new families of generically smooth components of the Hilbert scheme of curves, including components whose general points correspond to non-linearly normal curves, as well as nonreduced components.