Einstein condition and twistor spaces of compatible partially complex structures (Q1775933)

Let \(\mathcal F_k \rightarrow M\) be the bundle over the Riemannian manifold \((M,g)\), whose fibre at each \(p\in M\) consists of all \(f\)-structures (i.e. \(f^3 +f = 0\), [\textit{K. Yano}, Tensor, New Ser. 14, 99--109 (1963; Zbl 0122.40705)]) of rank \(2k\) on \((T_p M,g_p)\), which are compatible with the metric. On the manifold \(\mathcal F_k\), a family of natural metrics are constructed and among them, the main results here characterize those which are Einstein as well as those which satisfy a generalization of the Einstein condition.