Abstract:
This is a sequel to talk I. Here I will consider a

normal projective variety X with trivial canonical class as before, with canonical singularities only in codimension at least 3 and vanishing second Chern class. I will show that there is a covering Y of X which is etale in codimension 2, such Y is a torus. This is again a joint work with D.Greb and S. Kebekus. This generalizes the classical result that a Ricci flat compact Kaehler manifold is an etale quotient of a torus.

normal projective variety X with trivial canonical class as before, with canonical singularities only in codimension at least 3 and vanishing second Chern class. I will show that there is a covering Y of X which is etale in codimension 2, such Y is a torus. This is again a joint work with D.Greb and S. Kebekus. This generalizes the classical result that a Ricci flat compact Kaehler manifold is an etale quotient of a torus.