Add to ORKGLet $D$ be any elliptic right cylinder. We prove that every type of knot can be realized as the trajectory of a ball in $D.$ This proves a conjecture of Lamm and gives a new proof of a conjecture of Jones and Przytycki. We use Jacobi's proof of Poncelet's theorem by means of elliptic functions
AbstractSolution to the following problem is considered: for given conics C and K and an integer N⩾3...
In this expository article we will describe some elementary properties of billiards and Poncelet map...
AbstractGiven two ellipses, one surrounding the other one, Poncelet introduced a map P from the exte...
AbstractWe study the deep interplay between geometry of quadrics in d-dimensional space and the dyna...
We define cylinder knots as billiard knots in a cylinder. We present a necessary condition for cylin...
Poncelet's closure theorem concerns pairs of conics in the plane, and the existence of a fixed point...
47 pages, 18 figuresInternational audienceConsider a periodic tiling of a plane by equal triangles o...
In this work we study the dynamics of triangle tiling billiards. We unite geometric and combinatoria...
Poncelet's theorem is a famous result in algebraic geometry, dating to the early part of the ninetee...
Given two ellipses, one surrounding the other one, Poncelet introduced a map P from the exterior on...
The goal of the book is to present, in a complete and comprehensive way, areas of current research i...
We study resonant billiard trajectories within quadrics in the $d$-dimensional Euclidean space. We r...
AbstractThe thirty years old programme of Griffiths and Harris of understanding higher-dimensional a...
International audienceBy a classical result of Darboux, a foliation of a Riemannian surface has the ...
We consider an outer billiard around a Reulaux triangle. We prove the existence of infinitely many p...
AbstractSolution to the following problem is considered: for given conics C and K and an integer N⩾3...
In this expository article we will describe some elementary properties of billiards and Poncelet map...
AbstractGiven two ellipses, one surrounding the other one, Poncelet introduced a map P from the exte...
AbstractWe study the deep interplay between geometry of quadrics in d-dimensional space and the dyna...
We define cylinder knots as billiard knots in a cylinder. We present a necessary condition for cylin...
Poncelet's closure theorem concerns pairs of conics in the plane, and the existence of a fixed point...
47 pages, 18 figuresInternational audienceConsider a periodic tiling of a plane by equal triangles o...
In this work we study the dynamics of triangle tiling billiards. We unite geometric and combinatoria...
Poncelet's theorem is a famous result in algebraic geometry, dating to the early part of the ninetee...
Given two ellipses, one surrounding the other one, Poncelet introduced a map P from the exterior on...
The goal of the book is to present, in a complete and comprehensive way, areas of current research i...
We study resonant billiard trajectories within quadrics in the $d$-dimensional Euclidean space. We r...
AbstractThe thirty years old programme of Griffiths and Harris of understanding higher-dimensional a...
International audienceBy a classical result of Darboux, a foliation of a Riemannian surface has the ...
We consider an outer billiard around a Reulaux triangle. We prove the existence of infinitely many p...
AbstractSolution to the following problem is considered: for given conics C and K and an integer N⩾3...
In this expository article we will describe some elementary properties of billiards and Poncelet map...
AbstractGiven two ellipses, one surrounding the other one, Poncelet introduced a map P from the exte...