Non-negative curvature on certain product manifolds
Abstract
Let G/H be a closed, simply connected homogeneous manifold. Suppose every stable class of real vector bundles over G/H contains a homogeneous bundle. Then, for any closed, simply connected smooth manifold M homotopy equivalent to G/H, there exists n>dim(M) such that the product manifold M× Sn admits a metric with non-negative sectional curvature. Many homogeneous manifolds satisfy this assumption, including simply connected compact rank-one symmetric spaces, and among others.
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