Homogeneous para-K\"ahler Einstein manifolds

Abstract

A para-K\"ahler manifold can be defined as a pseudo-Riemannian manifold (M,g) with a parallel skew-symmetric para-complex structures K, i.e. a parallel field of skew-symmetric endomorphisms with K2 = Id or, equivalently, as a symplectic manifold (M,ω) with a bi-Lagrangian structure L, i.e. two complementary integrable Lagrangian distributions. A homogeneous manifold M = G/H of a semisimple Lie group G admits an invariant para-K\"ahler structure (g,K) if and only if it is a covering of the adjoint orbit AdGh of a semisimple element h. We give a description of all invariant para-K\"ahler structures (g,K) on a such homogeneous manifold. Using a para-complex analogue of basic formulas of K\"ahler geometry, we prove that any invariant para-complex structure K on M = G/H defines a unique para-K\"ahler Einstein structure (g,K) with given non-zero scalar curvature. An explicit formula for the Einstein metric g is given. A survey of recent results on para-complex geometry is included.