一类特殊康托树表面上大地流的非极性

Proceedings of the American Mathematical Society, Series B Pub Date : 2024-07-01 DOI:10.1090/bproc/228

Michael Pandazis

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引用次数: 0

摘要

当且仅当其单位切线束上的大地流是遍历的时候，一个配备了共形双曲度量的黎曼曲面才是抛物面。设 X X 是康托树或开花康托树黎曼曲面。固定 X X 的测地线裤子分解，并称分解中的边界测地线为袖口。巴斯马坚、哈科比扬和沙里奇证明，如果袖口的长度迅速趋于零，那么 X X 是抛物面。最近，Šarić 证明了袖口长度收敛到零的速度稍慢意味着 X X 不是抛物线。在本文中，我们在袖口收敛到零的两个速率之间进行插值，发现这些曲面不是抛物面，从而完成了对问题的解释。

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Nonergodicity of the geodesic flow on a special class of Cantor tree surfaces

A Riemann surface equipped with its conformal hyperbolic metric is parabolic if and only if the geodesic flow on its unit tangent bundle is ergodic. Let X X be a Cantor tree or a blooming Cantor tree Riemann surface. Fix a geodesic pants decomposition of X X and call the boundary geodesics in the decomposition cuffs. Basmajian, Hakobyan, and Šarić proved that if the lengths of cuffs are rapidly converging to zero, then X X is parabolic. More recently, Šarić proved a slightly slower convergence of lengths of cuffs to zero implies X X is not parabolic. In this paper, we interpolate between the two rates of convergence of the cuffs to zero and find that these surfaces are not parabolic, thus completing the picture.

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来源期刊

Proceedings of the American Mathematical Society, Series B

CiteScore

1.60

自引率

0.00%

发文量