Symmetric Periodic Orbits and Uniruled Real Liouville Domains

Symmetric Periodic Orbits and Uniruled Real Liouville Domains

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摘要 A real Liouville domain is a Liouville domain with an exact anti-symplectic involution. The authors call a real Liouville domain uniruled if there exists an invariant finite energy plane through every real point. Asymptotically, an invariant finite energy plane converges to a symmetric periodic orbit. In this note, they work out a criterion which guarantees uniruledness for real Liouville domains. A real Liouville domain is a Liouville domain with an exact anti-symplectic involution. The authors call a real Liouville domain uniruled if there exists an invariant finite energy plane through every real point. Asymptotically, an invariant finite energy plane converges to a symmetric periodic orbit. In this note, they work out a criterion which guarantees uniruledness for real Liouville domains.

作者 Urs FRAUENFELDER Otto van KOERT

机构地区 Department of Mathematics Department of Mathematics and Research Institute of Mathematics

出处《Chinese Annals of Mathematics,Series B》 SCIE CSCD 2016年第4期607-624,共18页 数学年刊（B辑英文版）

基金 supported by National Research Foundation of Korea(No.2012-011755) a stipend from the Humboldt foundation

关键词周期轨道 LIOUVILLE 对称平面能量收敛 Symmetric periodic orbits, Real symplectic manifolds, Real uniruledness

分类号 O186.12 [理学—基础数学]

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Chinese Annals of Mathematics,Series B

2016年第4期

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Symmetric Periodic Orbits and Uniruled Real Liouville Domains

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