论文信息 - The First Birkhoff Coefficient and the Stability of 2-Periodic Orbits on Billiards

The First Birkhoff Coefficient and the Stability of 2-Periodic Orbits on Billiards

In this work we address the question of proving the stability of elliptic 2-periodic orbits for strictly convex billiards. Even though it is part of a widely accepted belief that ellipticity implies stability, classical theorems show that the certainty of stability relies upon more precise conditions. We present a review of the main results and general theorems and describe the procedure to fulfill the supplementary conditions for strictly convex billiards.

Sylvie Oliffson Kamphorst | Sônia Pinto-de-Carvalho | S. O. Kamphorst | S. Pinto-de-Carvalho

[1] D. Saari,et al. Stable and Random Motions in Dynamical Systems , 1975 .

[2] S. O. Kamphorst,et al. Elliptic islands in strictly convex billiards , 2002, Ergodic Theory and Dynamical Systems.

[3] G. G. Stokes. "J." , 1890, The New Yale Book of Quotations.

[4] Marek R Rychlik. Complexity and Applications of Parametric Algorithms of Computational Algebraic Geometry , 2000 .

[5] M. Berry,et al. Regularity and chaos in classical mechanics, illustrated by three deformations of a circular 'billiard' , 1981 .

[6] T. Morrison,et al. Dynamical Systems , 2021, Nature.

[7] Jürgen Moser,et al. Lectures on Celestial Mechanics , 1971 .

[8] R. Moeckel. Generic bifurcations of the twist coefficient , 1990, Ergodic Theory and Dynamical Systems.

[9] J. Strelcyn,et al. Some new results on Robnik billiards , 1987 .

[10] A. Katok,et al. Introduction to the Modern Theory of Dynamical Systems: Low-dimensional phenomena , 1995 .

[11] Marek Rychlik. Periodic points of the billiard ball map in a convex domain , 1989 .

[12] V. V. Kozlov,et al. Billiards: A Genetic Introduction to the Dynamics of Systems with Impacts , 1991 .

[14] B. O. Koopman. Birkhoff on Dynamical Systems , 1930 .