Misha Verbitsky
Published 2012-10-25Version 1
A Hermitian metric $\omega$ on a complex manifold is called SKT or pluriclosed if $dd^c\omega=0$. Let M be a twistor space of a compact, anti-selfdual Riemannian manifold, admitting a pluriclosed Hermitian metric. We prove that in this case M is K\"ahler, hence isomorphic to $\C P^3$ or a flag space. This result is obtained from rational connectedness of the twistor space, due to F. Campana. As an aside, we prove that the moduli space of rational curves on the twistor space of a K3 surface is Stein.
Comments: 12 pages
Journal: Geometry and Topology 18 (2014) 897-909
Hessian of the natural Hermitian form on twistor spaces
Chern connections and Chern curvature of the tangent bundle of almost complex manifolds
Plurisubharmonic functions and positive currents of type (1,1) over almost complex manifolds
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