The Prescribed Ricci Curvature Problem on Homogeneous Spaces with Intermediate Subgroups
Abstract
Consider a compact Lie group G and a closed subgroup H<G. Suppose M is the set of G-invariant Riemannian metrics on the homogeneous space M=G/H. We obtain a sufficient condition for the existence of g∈ M and c>0 such that the Ricci curvature of g equals cT for a given T∈ M. This condition is also necessary if the isotropy representation of M splits into two inequivalent irreducible summands. Immediate and potential applications include new existence results for Ricci iterations.
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