The twistor space of a compact hypercomplex manifold is never Moishezon
Abstract
Let (X,I,J,K) be a compact hypercomplex manifold, i.e. a smooth manifold X with an action of the quaternion algebra (Id,I,J,K) on the tangent bundle TX, inducing integrable almost complex structures. For any (a, b, c) ∈ S2, the linear combination L := aI + bJ + cK defines another complex structure on X. This results in a C P1-family of complex structures called the twistor family. Its total space is called the twistor space. We show that the twistor space of a compact hypercomplex manifold is never Moishezon and, moreover, it is never Fujiki class C (in particular, never Kahler and never projective).
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