Curvatures of real connections on Hermitian manifolds
Abstract
Let (M,g,J) be a Riemannian manifold with a compatible integrable complex structure J∈End(TR M) and Ag,J be the space of real connections on TR M preserving both g and J. In this paper, we investigate the relationship between the geometry of real connections in Ag,J and that of Hermitian connections on T1,0M. In particular, we study the geometry of the real Chern connection ∇Ch,R on (M,g,J), and obtain K\"ahler-Einstein metrics by using real Chern-Einstein metrics.
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