Limits of nodal surfaces and applications

Abstract

Let X D be a flat family of projective complex 3-folds over a disc D with smooth total space X and smooth general fibre Xt, and whose special fiber X0 has double normal crossing singularities, in particular, X0=A B, with A, B smooth threefolds intersecting transversally along a smooth surface R=A B. In this paper we first study the limit singularities of a δ--nodal surface in the general fibre St⊂ Xt, when St tends to the central fibre in such a way its δ nodes tend to distinct points in R. The result is that the limit surface S0 is in general the union S0=SA SB, with SA⊂ A, SB⊂ B smooth surfaces, intersecting on R along a δ-nodal curve C=SA R=SB B. Then we prove that, under suitable conditions, a surface S0=SA SB as above indeed deforms to a δ--nodal surface in the general fibre of X D. As applications we prove that there are regular irreducible components of the Severi variety of degree d surfaces with δ nodes in P3, for every δ≤ d-1 2 and of the Severi variety of complete intersection δ-nodal surfaces of type (d,h), with d≥ h-1 in P4, for every δ≤ d+3 3-d-h+1 3-1.