arXiv:1902.08130 Abstract | arXiv Analytics

arXiv:1902.08130 [math.DS]Abstract References Reviews Resources

Hyperbolicity of asymmetric lemon billiards

Published 2019-02-21Version 1

Asymmetric lemon billiards was introduced in [CMZZ], where the billiard table $Q(r,b,R)$ is the intersection of two round disks with radii $r\le R$, respectively, and $b$ measures the distance between the two centers. The boundary consists of two circular arcs $\Gamma_r$ and $\Gamma_R$. It is conjectured [BZZ] that the asymmetric lemon billiards is hyperbolic when the arc $\Gamma_r$ is a major arc and $R$ is large. In this paper we prove this conjecture for sufficiently large $R$.

Categories: math.DS

Keywords: asymmetric lemon billiards, hyperbolicity, boundary consists, circular arcs, major arc

Related articles: Most relevant | Search more

arXiv:1412.0173 [math.DS] (Published 2014-11-30)

On another edge of defocusing: hyperbolicity of asymmetric lemon billiards

Leonid Bunimovich, Hong-Kun Zhang, Pengfei Zhang

arXiv:1605.03332 [math.DS] (Published 2016-05-11)

On shadowing and hyperbolicity for geodesic flows on surfaces

Mario Bessa, Maria Joana Torres, Joao Lopes Dias

arXiv:1203.4990 [math.DS] (Published 2012-03-22)

On hyperbolicity of minimizers for 1D random Lagrangian systems

Alexandre Boritchev, Konstantin Khanin