Isotropy summands and Einstein Equation of Invariant Metrics on Classical Flag Manifolds
Abstract
It is well known that the Einstein equation on a Riemannian flag manifold (G/K,g) reduces to a algebraic system, if g is a G-invariant metric. In this paper we described this system for all flag manifolds of a classical Lie group. We also determined the number of isotropy summands for all of these spaces and proved certain properties of the set of t-roots for flag manifolds of type Bn, Cn and Dn.
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