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Related papers: Non-smooth convex caustics for Birkhoff billiard

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We prove that the billiard claimed to be a possible counterexample to the Birkhoff-Poritsky conjecture is actually not a counterexample. We also show that for a billiard in a table obtained by the string construction over any convex…

Dynamical Systems · Mathematics 2024-04-04 Leonid Bunimovich , Roberta Shapiro

We consider a remarkable $C^2$-smooth billiard table introduced by Hans L.Fetter. It is obtained by the string construction from a regular hexagon for a special value of the length of the string. It was suggested as a possible…

Dynamical Systems · Mathematics 2022-02-15 Misha Bialy , Baruch Youssin

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

A caustic of a strictly convex planar bounded billiard is a smooth curve whose tangent lines are reflected from the billiard boundary to its tangent lines. The famous Birkhoff Conjecture states that if the billiard boundary has an inner…

Dynamical Systems · Mathematics 2022-12-13 Alexey Glutsyuk

In this paper we study convex caustics in Minkowski billiards. We show that for the Euclidean billiard dynamics in a planar smooth centrally symmetric and strictly convex body $K$, for every convex caustic which $K$ possesses, the "dual"…

Dynamical Systems · Mathematics 2018-03-14 Shiri Artstein-Avidan , Dan Itzhak Florentin , Yaron Ostrover , Daniel Rosen

In this paper we are interested in the motion of a ball inside a billiard table bounded by a particular smooth curve. This table belongs to a family of billiards which can all be drawn by a common process: the so-called gardener's string…

Mathematical Physics · Physics 2012-03-26 Hans L. Fetter

We investigate the regularity of invariant curves of rotation number $1/2$ for a special class of symplectic twist maps of the annulus, billiard maps. We construct strictly convex smooth tables close to the circle having singular (i.e. not…

Dynamical Systems · Mathematics 2025-08-13 Stefano Baranzini

In this paper we prove the Birkhoff-Poritsky conjecture for centrally-symmetric $C^2$-smooth convex planar billiards. We assume that the domain $\mathcal A$ between the invariant curve of $4$-periodic orbits and the boundary of the phase…

Dynamical Systems · Mathematics 2022-03-01 Misha Bialy , Andrey E. Mironov

Reflection in strictly convex bounded planar billiard acts on the space of oriented lines and preserves a standard area form. A caustic is a curve $C$ whose tangent lines are reflected by the billiard to lines tangent to $C$. The famous…

Dynamical Systems · Mathematics 2024-05-08 Alexey Glutsyuk

In this article we discuss pointwise spectral rigidity results for several billiard systems (e.g., Birkhoff billiards, symplectic billiards and $4$-th billiards), showing that a single value of Mather's $\beta$-function can determine…

Dynamical Systems · Mathematics 2025-12-23 Stefano Baranzini , Misha Bialy , Alfonso Sorrentino

In this note we study caustic-free regions for convex billiard tables in the hyperbolic plane or the hemisphere. In particular, following a result by Gutkin and Katok in the Euclidean case, we estimate the size of such regions in terms of…

Dynamical Systems · Mathematics 2021-06-15 Dan Itzhak Florentin , Yaron Ostrover , Daniel Rosen

We generalize the following simple geometric fact: the only centrally symmetric convex curve of constant width is a circle. Billiard interpretation of the condition of constant width reads: a planar curve has constant width, if and only if,…

Dynamical Systems · Mathematics 2022-03-30 Misha Bialy , Daniel Tsodikovich

In the recent paper arXiv:2405.13258, the first author of this note proved that if a billiard in a convex domain in $\mathbb{R}^n$ is simultaneously projective and Minkowski, then it is the standard Euclidean billiard in an appropriate…

Dynamical Systems · Mathematics 2026-04-07 Alexey Glutsyuk , Vladimir S. Matveev

In this work we address the question of proving the stability of elliptic 2-periodic orbits for strictly convex billiards. Eventhough it is part of a widely accepted belief that ellipticity implies stability, classical theorems show that…

Chaotic Dynamics · Physics 2007-05-23 Sylvie Oliffson Kamphorst , Sonia Pinto de Carvalho

The classical Birkhoff conjecture claims that the boundary of a strictly convex integrable billiard table is necessarily an ellipse (or a circle as a special case). In this article we prove a complete local version of this conjecture: a…

Dynamical Systems · Mathematics 2018-03-22 Vadim Kaloshin , Alfonso Sorrentino

It is known that $C^1$-smooth strictly convex Radon norms in $\mathbb{R}^2$ can be characterized by the property that the outer billiard map, which corresponds to the unit ball of the norm, has an invariant curve consisting of 4-periodic…

Dynamical Systems · Mathematics 2026-02-11 Mark Berezovik , Misha Bialy

For strictly convex billiard maps of smooth boundaries, we get a Birkhoff normal form via a list of constructive generating functions. Based on this, we get an explicit formula for the beta function (locally), and explored the relation…

Dynamical Systems · Mathematics 2020-09-29 Jianlu Zhang

Since the seminal work of Sinai one studies chaotic properties of planar billiards tables. Among them is the study of decay of correlations for these tables. There are examples in the literature of tables with exponential and even…

Dynamical Systems · Mathematics 2009-07-07 A. Arbieto , R. Markarian , M. J. Pacifico , R. Soares

One of the most interesting problems in the theory of Birkhoff billiards is the problem of integrability. In all known examples of integrable billiards, the billiard tables are either conics, quadrics (closed ellipsoids as well as unclosed…

Dynamical Systems · Mathematics 2025-01-23 Andrey E. Mironov , Siyao Yin

This work presents a framework for billiards in convex domains on two dimensional Riemannian manifolds. These domains are contained in connected, simply connected open subsets which are totally normal. In this context, some basic properties…

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