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Hessian of Busemann functions and rank of Hadamard manifolds
Abstract: In this article we show that every geodesic is rank one and the Hessian of Busemann functions is positive definite for a harmonic Damek-Ricci space, a two step solvable Lie group with a left invariant metric. Moreover, the eigenspace of the Hessian of Busemann functions on a Hadamard manifold (M, g) corresponding to eigenvalue zero is investigated with respect to rank of geodesics. On a harmonic Hadamard manifold which is of purely exponential volume growth, or of hypergeometric type it is shown that every Bus…
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2020
2020
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Cited by 1 publication
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References 14 publications
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“…Refer to [18]. For an approach for determination of the volume density different from ours refer to [28].…”
Section: ′′mentioning
confidence: 99%
“…Refer to [18]. For an approach for determination of the volume density different from ours refer to [28].…”
Section: ′′mentioning
confidence: 99%
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