Universal covering calabi-yau manifolds of the Hilbert schemes of n points of Enriques surfaces

Abstract

Throughout this paper, we work over C, and n is an integer such that n≥ 2. For an Enriques surface E, let E[n] be the Hilbert scheme of n points of E. By Oguiso and Schr\"oer, E[n] has a Calabi-Yau manifold X as the universal covering space, π :X→ E[n] of degree 2. The purpose of this paper is to investigate a relationship of the small deformation of E[n] and that of X ( Theorem\ 1.1), the natural automorphism of E[n] ( Theorem\,1.2), and count the number of isomorphism classes of the Hilbert schemes of n points of Enriques surfaces which has X as the universal covering space when we fix one X ( Theorem\,1.3).