Deformations of hyperelliptic and generalized hyperelliptic polarized varieties

Abstract

In this article we study the deformations of hyperelliptic polarized varieties (X,L) of dimension m and sectional genus g such that the image Y of the morphism induced by |L| is smooth. If Lm < 2g-2, it is known that, by adjunction and the Clifford's theorem, any deformation of (X,L) is hyperelliptic. Thus, we focus on when Lm=2g-2 or Lm=2g. We prove that, if (X,L) is Fano-K3, then, except when Y is a hyperquadric, all deformations of (X,L) are again hyperelliptic (if Y is a hyperquadric, the general deformation of is an embedding). This contrasts with the situation of hyperelliptic canonical curves and hyperelliptic K3 surfaces. If Lm=2g, then we prove that, in most cases, a general deformation of is a finite morphism of degree 1. This provides interesting examples of degree 2 morphisms that can be deformed to morphisms of degree 1. We extend our results to so-called generalized hyperelliptic polarized Fano, Calabi-Yau and general type varieties. The solutions to these questions are closely intertwined with the existence or non existence of double structures on the algebraic varieties Y. We address this matter as well.