Abstract
We consider G-invariant affinor metric structures and their particular cases, sub-Kahler structures, on a homogeneous space G/H. The affinor metric structures generalize almost Kahler and almost contact metric structures to manifolds of arbitrary dimension. We consider invariant sub-Riemannian and sub-Kahler structures related to a fixed 1-form with a nontrivial radical. In addition to giving some results for homogeneous spaces of arbitrary dimension, we study these structures separately on the homogeneous spaces of dimension 4 and 5.
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