Light chaotic dynamics in the transformation from curved to flat surfaces
Chenni Xu, Itzhack Dana, Li-Gang Wang, and Patrick Sebbah
TL;DR
This paper investigates how light behaves chaotically on curved surfaces by transforming the problem into an equivalent flat billiard with variable refractive index, revealing how geometry controls chaos.
Contribution
It establishes a novel equivalence between curved surface light dynamics and flat inhomogeneous billiards, enabling control of chaos through geometric parameters.
Findings
Chaos degree is governed by a single geometric parameter.
The equivalence allows extension to other curved surfaces.
Potential applications in optical device design.
Abstract
Light propagation on a two-dimensional curved surface embedded in a three-dimensional space has attracted increasing attention as an analog model of four-dimensional curved spacetime in laboratory. Despite recent developments in modern cosmology on the dynamics and evolution of the universe, investigation of nonlinear dynamics of light in non-Euclidean geometry is still scarce and remains challenging. Here, we study classical and wave chaotic dynamics on a family of surfaces of revolution by considering its equivalent conformally transformed flat billiard, with nonuniform distribution of refractive index. This equivalence is established by showing how these two systems have the same equations and the same dynamics. By exploring the Poincar\'{e} surface of section, the Lyapunov exponent and the statistics of eigenmodes and eigenfrequency spectrum in the transformed inhomogeneous table…
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Taxonomy
TopicsQuantum chaos and dynamical systems · Chaos control and synchronization · Scientific Research and Discoveries