3-Manifolds with Constant Ricci Eigenvalues (λ, λ, 0)
Abstract
We consider complete Riemannian 3-manifolds whose Ricci tensors have constant eigenvalues (λ, λ, 0). When π1 is finitely generated, we classify the topology of such manifolds by showing that they have a free fundamental group if non-trivial and that every free group is obtained. We give a description up to isometry, when the metric is locally irreducible or when it is analytic.
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