Berwald spaces of bounded curvature are Riemannian

Published 9 Aug 2018 in math.DG | (1808.02999v1)

Abstract: We prove that Berwald spaces whose flag curvature is nowhere vanishing are in fact Riemannian spaces. This means that any Berwald space with flag curvature bounded below by a positive number must be also Riemannian. This rigidity result shows the importance of non-Riemannian examples when imposing flag curvature bounds on Finsler spaces.

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