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By a Calabi-Yau manifold, I mean a compact complex manifold whose canonical bundle is trivial and $$H^i (X, O_X) = H^0(X, \Omega_X^i) = 0$$ for $0 < i < \dim X$. Infinitely many topological types of …

In an article of Robert Friedman, I came up with a comment: There are finitely many deformation types of Calabi-Yau threefolds for a given diffeomorhpic type if $b_2 =1$. And it is said that this is …

One can show that such a map in the question doesn't exist (no need to assume simply-connectedness). As abx pointed out, any finite map between smooth projective varieties with trivial canonical bundl …

By a threefold, I mean a compact complex manifold of dimension three. For a simply-connected threefold with trivial canonical class, its Betti numbers satisfy: $$b_2 \ge 0, b_3 \ge 2.$$ I am wondering …