Metrics of constant scalar curvature on sphere bundles
Abstract
Let G/H be a Riemannian homogeneous space. For an orthogonal representation φ of H on the Euclidean space Rk+1, there corresponds the vector bundle E=G×φRk+1 G/H with fiberwise inner product. Provided that φ is the direct sum of at most two representations which are either trivial or irreducible, we construct metrics of constant scalar curvature on the unit sphere bundle UE of E. When G/H is the round sphere, we study the number of constant scalar curvature metrics in the conformal classes of these metrics.
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