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We introduce a new notion of stability for periodic orbits in polygonal billiards. We say that a periodic orbit of a polygonal billiard is $\lambda$-stable if there is a periodic orbit for the corresponding pinball billiard which converges…

Dynamical Systems · Mathematics 2016-11-23 José Pedro Gaivão , Serge Troubetzkoy

We present here a new method which applies well ordered symbolic dynamics to find unstable periodic and non-periodic orbits in a chaotic system. The method is simple and efficient and has been successfully applied to a number of different…

chao-dyn · Physics 2009-10-28 Kai T. Hansen

I announce a solution of the conjecture about the measure of periodic points for planar billiard tables. The theorem says that if $\Om\subset\R^2$ is a compact domain with piecewise $C^3$ boundary, then the set of periodic orbits for the…

Dynamical Systems · Mathematics 2007-05-23 Eugene Gutkin

In this work, we construct linearly stable periodic orbits in $3$-dimensional domains with boundaries containing focusing components (small pieces of a sphere) where we place these components arbitrarily far apart. It demonstrates that we…

Dynamical Systems · Mathematics 2022-04-13 Hassan Attarchi

We show ergodicity of (asymmetric) lemon billiards, billiard tables that are the intersection of two circles of which one contains the centers of both. These do not satisfy the Wojtkowski criteria for hyperbolicity, but we establish…

Dynamical Systems · Mathematics 2025-11-19 Wentao Fan , Boris Hasselblatt

In standard (mathematical) billiards a point particle moves uniformly in a billiard table with elastic reflections off the boundary. We show that in transition from mathematical billiards to physical billiards, where a finite size hard…

Dynamical Systems · Mathematics 2019-10-23 L. A. Bunimovich

The boundary of the lemon billiards is defined by the intersection of two circles of equal unit radius with the distance $2B$ between their centers, as introduced by Heller and Tomsovic in Phys. Today {\bf 46} 38 (1993). This paper is a…

Chaotic Dynamics · Physics 2021-05-03 Črt Lozej , Dragan Lukman , Marko Robnik

In this paper we present new results regarding the periodicity of outer billiards in the hyperbolic plane around polygonal tables which are tiles in regular two-piece tilings of the hyperbolic plane.

Dynamical Systems · Mathematics 2016-01-20 FIliz Dogru , Emily Fischer , Cristian Mihai Munteanu

In this paper, we continue to study billiards inside cones $K\subset \mathbb{R}^n$ over strictly convex closed $C^3$ manifolds with non-degenerate second fundamental form. Recently we proved that the billiard is superintegrable, i.e., the…

Dynamical Systems · Mathematics 2026-03-31 Andrey E. Mironov , Siyao Yin

We examine the spectral properties of three-dimensional quantum billiards with a single pointlike scatterer inside. It is found that the spectrum shows chaotic (random-matrix-like) characteristics when the inverse of the formal strength…

chao-dyn · Physics 2009-10-30 T. Shigehara , Taksu Cheon

We apply periodic orbit theory to a two-dimensional non-integrable billiard system whose boundary is varied smoothly from a circular to an equilateral triangular shape. Although the classical dynamics becomes chaotic with increasing…

Chaotic Dynamics · Physics 2008-11-26 Ken-ichiro Arita , Matthias Brack

A caustic of a billiard is a curve whose tangent lines are reflected to its own tangent lines. A billiard is called Birkhoff caustic-integrable, if there exists a topological annulus adjacent to its boundary from inside that is foliated by…

Dynamical Systems · Mathematics 2025-09-16 Alexey Glutsyuk

We study chaotic properties of eigenstates depending on the degree of complexity in boundaries of a 2D periodic billiard. Main attention is paid to the situation when the motion of a classical particle is strongly chaotic. Our approach…

Condensed Matter · Physics 2009-11-10 J. A. Méndez-Bermúdez , G. A. Luna-Acosta , F. M. Izrailev

We study the billiard dynamics in annular tables between two excentric circles. As the center and the radius of the inner circle change, a two parameters map is defined by the first return of trajectories to the obstacle. We obtain an…

Dynamical Systems · Mathematics 2025-07-24 R. B. Batista , M. J. Dias Carneiro , S. Oliffson Kamphorst

L. Boltzmann proposed a billiard model with a planar central force problem reflected against a line not passing through the center. He asserted that such a system is ergodic, which thus illustrates his ergodic hypothesis. However, it has…

Dynamical Systems · Mathematics 2023-11-17 Michael Plum , Airi Takeuchi , Lei Zhao

We investigate the integrability of Kepler billiards-mechanical billiard systems in which a particle moves under the influence of a Keplerian potential and reflects elastically at the boundary of a strictly convex planar domain. Our main…

Dynamical Systems · Mathematics 2025-07-14 Stefano Baranzini , Vivina L. Barutello , Irene De Blasi , Susanna Terracini

H${\acute{e}}$non [8] used an inclined billiard to investigate aspects of chaotic scattering which occur in satellite encounters and in other situations. His model consisted of a piecewise mapping which described the motion of a point…

Earth and Planetary Astrophysics · Physics 2014-08-26 Alan Roy , Nikolaos Georgakarakos

In this paper I will unite two games, symplectic billiards and tiling billiards. The new game is called symplectic tiling billiards. I will prove a result about periodic orbits of symplectic tiling billiards in a very special case and then…

Dynamical Systems · Mathematics 2025-05-06 Richard Evan Schwartz

We introduce a class of billiards with chaotic unidirectional flows (or non-chaotic unidirectional flows with "vortices") which go around a chaotic or non-chaotic "core", where orbits can change their orientation. Moreover, the…

Dynamical Systems · Mathematics 2022-06-22 Leonid A. Bunimovich

In this paper we study centrally symmetric Birkhoff billiard tables. We introduce a closed invariant set $\mathcal{M}_\mathcal{B}$ consisting of locally maximizing orbits of the billiard map lying inside the region $\mathcal{B}$ bounded by…

Dynamical Systems · Mathematics 2023-07-27 Misha Bialy
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