Flag curvature of invariant (α,β)-metrics of type (α+β)2α
Abstract
In this paper we study flag curvature of invariant (α,β)-metrics of the form (α+β)2α on homogeneous spaces and Lie groups. We give a formula for flag curvature of invariant metrics of the form F=(α+β)2α such that α is induced by an invariant Riemannian metric g on the homogeneous space and the Chern connection of F coincides to the Levi-Civita connection of g. Then some conclusions in the cases of naturally reductive homogeneous spaces and Lie groups are given.
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