Remarks on degenerations of hyper-K\"ahler manifolds

Abstract

Using the Minimal Model Program, any degeneration of K-trivial varieties can be arranged to be in a Kulikov type form, i.e. with trivial relative canonical divisor and mild singularities. In the hyper-K\"ahler setting, we can then deduce a finiteness statement for monodromy acting on H2, once one knows that one component of the central fiber is not uniruled. Independently of this, using deep results from the geometry of hyper-K\"ahler manifolds, we prove that a finite monodromy projective degeneration of hyper-K\"ahler manifolds has a smooth filling (after base change and birational modifications). As a consequence of these two results, we prove a generalization of Huybrechts' theorem about birational versus deformation equivalence, allowing singular central fibers. As an application, we give simple proofs for the deformation type of certain geometric constructions of hyper-K\"ahler manifolds (e.g. Debarre--Voisin or Laza--Sacc\`a--Voisin). In a slightly different direction, we establish some basic properties (dimension and rational homology type) for the dual complex of a Kulikov type degeneration of hyper-K\"ahler manifolds.