Ray and wave chaos in asymmetric resonant optical cavities

OPTICAL resonators are essential components of lasers and other optical devices. A resonator is characterized by a set of modes, each with a resonant frequency ω and resonance width δω= 1/τ, where τ is the lifetime of a photon in the mode. Cylindrical or spherical dielectric resonators have extremely long-lived resonances1 due to 'whispering gallery' modes in which light circulates around the perimeter trapped by total internal reflection. These resonators emit light isotropically. Recently a new category of asymmetric resonant cavities has been proposed in which substantial deformation of the cavity from cylindrical or spherical symmetry leads to partially chaotic ray dynamics. This has been predicted2–4 to give rise to a universal, frequency-independent broadening of the whispering-gallery resonances, and to highly anisotropic emission. Here we present solutions of the wave equation for asymmetric resonant cavities which confirm these predictions but also reveal interesting frequency-dependent effects characteristic of quantum chaos. For small deformations the lifetime is controlled by evanescent leakage, the optical analogue of quantum tunnelling5; here the lifetime is significantly shortened by a process known as 'chaos-assisted tunnelling'6,7. In contrast, for large deformations (˜10%) some resonances are found to have longer lifetimes than predicted by the ray chaos model due to the phenomenon of 'dynamical localization'8.

[1]  Vladimir F. Lazutkin,et al.  Kam Theory and Semiclassical Approximations to Eigenfunctions , 1993 .

[2]  M. Berry,et al.  Classical billiards in magnetic fields , 1985 .

[3]  Jorge V. José,et al.  Chaos in classical and quantum mechanics , 1990 .

[4]  M. Gell-Mann,et al.  Physics Today. , 1966, Applied optics.

[5]  A. Stone,et al.  Directional emission from asymmetric resonant cavities. , 1996, Optics letters.

[6]  Richard K. Chang,et al.  Q spoiling and directionality in deformed ring cavities. , 1994, Optics letters.

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

[8]  K. Young,et al.  Optical Processes in Microcavities — The Role of Quasinormal Modes , 1996 .

[9]  O. Bohigas,et al.  Quantum tunneling and chaotic dynamics , 1993 .

[10]  Chang,et al.  Ray chaos and Q spoiling in lasing droplets. , 1995, Physical review letters.

[11]  B. R. Johnson,et al.  Theory of morphology-dependent resonances : shape resonances and width formulas , 1993 .

[12]  Semiclassical description of tunneling in mixed systems: Case of the annular billiard. , 1995, Physical review letters.

[13]  Richart E. Slusher,et al.  Optical Processes in Microcavities , 1993 .

[14]  Marko Robnik,et al.  Classical dynamics of a family of billiards with analytic boundaries , 1983 .

[15]  Joseph B. Keller,et al.  Asymptotic solution of eigenvalue problems , 1960 .

[16]  Shepelyansky,et al.  Dynamical stability of quantum "chaotic" motion in a hydrogen atom. , 1986, Physical review letters.