Positive Ricci Curvature and the Length of a shortest periodic geodesic
Abstract
Let Mn be a closed Riemannian manifold of dimension n≥ 2, with Ricci curvature Ric ≥ n-1. We will show that any sphere of dimension m in the space of closed loops on Mn is homotopic to the sphere in the space of closed loops of length at most 8 π m. It follows that the length of a shortest periodic geodesic on Mn is bounded from above by 8 π (n-1).
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