We define and study a concrete stratification of the moduli space of Gorenstein stable surfaces X satisfying K 2 X = 2 and χ (O X ) = 4, by first establishing an isomorphism with the moduli space of plane octics with certain singularities, which is then easier to handle concretely. In total, there are 47 inhabited strata with altogether 78 components.
Let X be a compact complex manifold with trivial canonical bundle and satisfying the ∂∂-Lemma. We show that the Kuranishi space of X is a smooth universal deformation and that small deformations enjoy the same properties as X. If, in addition, X admits a complex symplectic form, then the local Torelli theorem holds and we obtain some information about the period map.We clarify the structure of such manifolds a little by showing that the Albanese map is a surjective submersion. arXiv:1711.05107v1 [math.DG]
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