The Dirichlet Problem for Einstein Metrics on Cohomogeneity One Manifolds
Abstract
Let G/H be a compact homogeneous space, and let g0 and g1 be G-invariant Riemannian metrics on G/H. We consider the problem of finding a G-invariant Einstein metric g on the manifold G/H× [0,1] subject to the constraint that g restricted to G/H× \0\ and G/H× \1\ coincides with g0 and g1, respectively. By assuming that the isotropy representation of G/H consists of pairwise inequivalent irreducible summands, we show that we can always find such an Einstein metric.
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