Localized structures in nonlinear optical cavities

Dissipative localized structures, also known as cavity solitons, arise in the transverse plane of several nonlinear optical devices. We present two general mechanisms for their formation and some scenarios for their instability. In situations of coexistence of a homogeneous and a pattern state, we characterize excitable behavior mediated by localized structures. In this scenario, excitability emerges directly from the spatial dependence since it is absent in the purely temporal dynamics. In situations of coexistence of two homogeneous states, we discuss localized structures either due to the interaction of front tails (dark ring cavity solitons) or due to a balance between curvature effects and modulational instabilities of front solutions (stable droplets).

[1]  Y. Kuznetsov Elements of applied bifurcation theory (2nd ed.) , 1998 .

[2]  Eugene M. Izhikevich,et al.  Neural excitability, Spiking and bursting , 2000, Int. J. Bifurc. Chaos.

[3]  R. Lefever,et al.  Spatial dissipative structures in passive optical systems. , 1987, Physical review letters.

[4]  William J. Firth,et al.  Pattern formation in a passive Kerr cavity , 1994 .

[5]  P Coullet,et al.  A new approach to data storage using localized structures. , 2004, Chaos.

[6]  Kestutis Staliunas,et al.  PATTERN FORMATION AND LOCALIZED STRUCTURES IN DEGENERATE OPTICAL PARAMETRIC MIXING , 1998 .

[7]  M San Miguel,et al.  Stable droplets and growth laws close to the modulational instability of a domain wall. , 2001, Physical review letters.

[8]  H. Purwins,et al.  SELF-ORGANIZED QUASIPARTICLES : BREATHING FILAMENTS IN A GAS DISCHARGE SYSTEM , 1999 .

[9]  M. Hoyuelos,et al.  Polarization Patterns in Kerr Media , 1998, Technical Digest. 1998 EQEC. European Quantum Electronics Conference (Cat. No.98TH8326).

[10]  Kestutis Staliunas,et al.  Spatial-localized structures in degenerate optical parametric oscillators , 1998 .

[11]  E. Meron Pattern formation in excitable media , 1992 .

[12]  L. Lugiato,et al.  Cavity solitons as pixels in semiconductor microcavities , 2002, Nature.

[13]  P. Umbanhowar,et al.  Localized excitations in a vertically vibrated granular layer , 1996, Nature.

[14]  Lange,et al.  Interaction of localized structures in an optical pattern-forming system , 2000, Physical review letters.

[15]  E. Wright,et al.  Polarisation patterns in a nonlinear cavity , 1994 .

[16]  W. Firth,et al.  From domain walls to localized structures in degenerate optical parametric oscillators , 1999 .

[17]  W. J. Firth,et al.  Cavity solitons , 2000, Conference Digest. 2000 International Quantum Electronics Conference (Cat. No.00TH8504).

[18]  Pere Colet,et al.  Dynamical properties of two-dimensional Kerr cavity solitons , 2002 .

[19]  Pere Colet,et al.  Excitability mediated by localized structures , 2005 .

[20]  P. Holmes,et al.  Nonlinear Oscillations, Dynamical Systems, and Bifurcations of Vector Fields , 1983, Applied Mathematical Sciences.

[21]  Paul Glendinning Stability, Instability and Chaos: GLOBAL BIFURCATION THEORY , 1994 .

[22]  W. J. Firth,et al.  Two-dimensional solitons in a Kerr cavity , 1996 .

[23]  P. Gaspard Measurement of the instability rate of a far-from-equilibrium steady state at an infinite period bifurcation , 1990 .

[24]  Optical bullet holes , 1996, Summaries of Papers Presented at the Quantum Electronics and Laser Science Conference.

[25]  G. Ermentrout,et al.  Analysis of neural excitability and oscillations , 1989 .

[26]  Salvador Balle,et al.  Experimental evidence of van der Pol-Fitzhugh-Nagumo dynamics in semiconductor optical amplifiers. , 2003, Physical review. E, Statistical, nonlinear, and soft matter physics.

[27]  P. Coullet,et al.  Nature of spatial chaos. , 1987, Physical review letters.

[28]  R. Lefever,et al.  Localized structures and localized patterns in optical bistability. , 1994, Physical review letters.

[29]  P. Coullet,et al.  Stable static localized structures in one dimension , 2000, Physical review letters.

[30]  D. Skryabin Energy of the soliton internal modes and broken symmetries in nonlinear optics , 2002 .

[31]  P. Colet,et al.  Stable droplets and nucleation in asymmetric bistable nonlinear optical systems , 2004 .

[32]  S. Fauve,et al.  Localized structures generated by subcritical instabilities , 1988 .

[33]  P. Mandel,et al.  REVIEW ARTICLE: Transverse dynamics in cavity nonlinear optics (2000 2003) , 2004 .

[34]  J. E. Pearson Complex Patterns in a Simple System , 1993, Science.

[35]  B Krauskopf,et al.  Excitability and coherence resonance in lasers with saturable absorber. , 1999, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[36]  Q Ouyang,et al.  Pattern Formation by Interacting Chemical Fronts , 1993, Science.

[37]  W. Firth,et al.  Characterization, dynamics and stabilization of diffractive domain walls and dark ring cavity solitons in parametric oscillators. , 2001, Physical review. E, Statistical, nonlinear, and soft matter physics.

[38]  M Radziunas,et al.  Excitability of a semiconductor laser by a two-mode homoclinic bifurcation. , 2001, Physical review letters.

[39]  F. T. Arecchi,et al.  Excitability following an avalanche-collapse process , 1997 .

[40]  Ouchi,et al.  Phase ordering kinetics in the Swift-Hohenberg equation. , 1996, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[41]  Firth,et al.  Optical bullet holes: Robust controllable localized states of a nonlinear cavity. , 1996, Physical review letters.

[42]  P. Colet,et al.  Stable droplets and dark-ring cavity solitons in nonlinear optical devices , 2003 .

[43]  M. S. Miguel,et al.  Self-similar domain growth, localized structures, and labyrinthine patterns in vectorial Kerr resonators , 1999, patt-sol/9908001.

[44]  Steven H. Strogatz,et al.  Nonlinear Dynamics and Chaos , 2024 .

[45]  Paul Glendinning,et al.  Stability, instability and chaos , by Paul Glendinning. Pp. 402. £45. 1994. ISBN 0 521 41553 5 (hardback); £17.95 ISBN 0 521 42566 2 (paperback) (Cambridge). , 1997, The Mathematical Gazette.