非负Ricci曲率开放流形中测地线回路的逃逸率

Jiayin Pan
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引用次数: 7

摘要

Cheeger-Gromoll分裂定理的一个结果表明,对于任意具有非负Ricci曲率的开流形$(M,x)$,如果$x$上所有表示$\pi_1(M,x)$的元素的最小测地环都包含在一个有界球中,则$\pi_1(M,x)$实际上是阿贝尔的。我们推广上述结果:如果这些最小表示的测地线环$\pi_1(M,x)$以相对于其长度的次线性速率从任何有界度量球中逃逸,则$\pi_1(M,x)$实际上是阿贝的。
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On the escape rate of geodesic loops in an open manifold with nonnegative Ricci curvature
A consequence of the Cheeger-Gromoll splitting theorem states that for any open manifold $(M,x)$ of nonnegative Ricci curvature, if all the minimal geodesic loops at $x$ that represent elements of $\pi_1(M,x)$ are contained in a bounded ball, then $\pi_1(M,x)$ is virtually abelian. We generalize the above result: if these minimal representing geodesic loops of $\pi_1(M,x)$ escape from any bounded metric balls at a sublinear rate with respect to their lengths, then $\pi_1(M,x)$ is virtually abelian.
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