Deformation equivalence of affine ruled surfaces

Abstract

A smooth family : V S of surfaces will be called completable if there is a logarithmic deformation ( V, D) over S so that V= V D. Two smooth surfaces V and V' are said to be deformations of each other if there is a completable flat family V S of smooth surfaces over a connected base so that V and V' are fibers over suitable points s,s'∈ S. This relation generates an equivalence relation called deformation equivalence. In this paper we give a complete combinatorial description of this relation in the case of affine ruled surfaces, which by definition are surfaces that admit an affine ruling V B over an affine base with possibly degenerate fibers. In particular we construct complete families of such affine ruled surfaces. In a few particular cases we can also deduce the existence of a coarse moduli space.