Closed geodesics and the first Betti number

arXiv - MATH - Symplectic Geometry Pub Date : 2024-07-03 DOI:arxiv-2407.02995
Gonzalo Contreras, Marco Mazzucchelli
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Abstract

We prove that, on any closed manifold of dimension at least two with non-trivial first Betti number, a $C^\infty$ generic Riemannian metric has infinitely many closed geodesics, and indeed closed geodesics of arbitrarily large length. We derive this existence result combining a theorem of Ma\~n\'e together with the following new theorem of independent interest: the existence of minimal closed geodesics, in the sense of Aubry-Mather theory, implies the existence of a transverse homoclinic, and thus of a horseshoe, for the geodesic flow of a suitable $C^\infty$-close Riemannian metric.
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封闭测地线和贝蒂首数
我们证明,在任何维数至少为二的闭流形上,且具有非三维第一贝蒂数的$C^\infty$泛黎曼度量有无限多的闭大地线,而且是任意大长度的闭大地线。我们结合 Ma\~n\'etogether 的一个定理和以下新定理得出了这一存在性结果:在奥布里-马瑟理论的意义上,最小闭大地线的存在意味着一个合适的 $C^\infty$ 闭黎曼公设的大地流存在一个横向同轴线,从而存在一个马蹄形。
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arXiv - MATH - Symplectic Geometry
arXiv - MATH - Symplectic Geometry
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