F. Flamini
Published 2001-03-29Version 1
In this paper we focus on the problem of computing the number of moduli of the so called Severi varieties (denoted by V(|D|, \delta)), which parametrize universal families of irreducible, \delta-nodal curves in a complete linear system |D|, on a smooth projective surface S of general type. We determine geometrical and numerical conditions on D and numerical conditions on \delta ensuring that such number coincides with dim(V(|D|, \delta). As related facts, we also determines some sharp results concerning the geometry of some Severi varieties.
Comments: Latex2e, 27 pages
A connected component of the moduli space of surfaces of general type with $p_g=0$
Deformation of canonical morphisms and the moduli of surfaces of general type
Moduli of products of curves
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