Add to ORKGFor homogeneous reductive spaces G/H with reductive complements decomposable into an orthogonal sum = ₁⊕₂⊕3 of three Ad(H)-invariant irreducible mutually inequivalent submodules we establish simple conditions under which an invariant metric - structure (, ) belongs to the classes G₁f , NKf, and Kill f of generalized Hermitian geometry. The statements obtained are then illustrated with four examples. Namely we consider invariant metric f-structures on the manifolds of oriented flags SO(n)/SO(2)x SO(n-3)(n ¸≥ 4), the Stiefel manifold SO(4)/SO(2), the complex flag manifold SU(3)/ₘₐₓ, and the quaternionic flag manifold Sp(3)/SU(2) x SU(2) x SU(2).peerReviewe
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We consider manifolds of oriented flags SO(n)/ SO(2)xSO(n−3) (n ≥ 4) as 4- and 6- symmetric spaces ...
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AbstractWe prove that any invariant hyper-complex structure on a homogeneous space M=G/L where G is ...
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Abstract. Here we consider the general flag manifold FΘ as a naturally re-ductive homogeneous space ...
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Here we present new results for the most general case of arbitrary Riemannian regular Ф-spaces. More...
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