The Wahl map of the normalization of nodal curves on Hirzebruch surfaces

Abstract

In this paper we study the Wahl map for the normalization of a δ-nodal curve C on a Hirzebruch surface Fn for n≥ 0. Let σ:X→ Fn be the blow up of Fn along the δ nodes of C and let C be the normalization of C under σ. Let KX be the canonical bundle of X and let 1X be the sheaf of 1-holomorphic forms on X. We give conditions for the surjectivity of the map X,OX(KX+C): 2H0(X,OX(KX+C))→ H0(X,1X(2KX+2C)). Using this surjectivity, we analyze the Wahl map C:2H0(C,1C)→ H0(C,(1C) 3) and compute the corank of C in various cases. We prove that the corank of the Wahl map for the normalization of a δ-nodal curve on Fn is h0(Fn,OFn(-KFn)), that verifies a conjecture by Wahl. Furthermore, as an application of our results, we demonstrate that, under certain conditions, a δ-nodal curve on a Hirzebruch surface Fn cannot be embedded as δ-nodal curve on a different Hirzebruch surface Fm, for n≠ m.