Discrete homoclinic orbits in a laser with feedback
- 1 December 2000
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review E
- Vol. 62 (6) , 8823-8825
- https://doi.org/10.1103/physreve.62.8823
Abstract
We provide experimental evidence of the discrete character of homoclinic chaos in a laser with feedback. We show that the narrow chaotic windows are distributed exponentially as a function of a control parameter. The number of consecutive chaotic regions corresponds to the number of loops around the saddle focus responsible for Shilnikov chaos. The characterization of homoclinic chaos is also done through the return map of the return times at a suitable reference point.Keywords
This publication has 13 references indexed in Scilit:
- Characterization of homoclinic chaos through double-valued return time mapsPhysical Review E, 1998
- Shil’nikov case of antiphase dynamics in a multimode laserOptics Communications, 1995
- Rössler chaos in opto-thermal bistable devicesOptics Communications, 1994
- Evidence of homoclinic chaos in the plasma of a glow dischargePhysical Review Letters, 1992
- Experimental Characterization of Shil'nikov Chaos by Statistics of Return TimesEurophysics Letters, 1988
- Shilnikov Dynamics in a Passive Q -Switching LaserEurophysics Letters, 1988
- Homoclinic orbits and cycles in the instabilities of a laser with a saturable absorberPhysical Review A, 1988
- Laser Dynamics with Competing InstabilitiesPhysical Review Letters, 1987
- What can we learn from homoclinic orbits in chaotic dynamics?Journal of Statistical Physics, 1983
- A CONTRIBUTION TO THE PROBLEM OF THE STRUCTURE OF AN EXTENDED NEIGHBORHOOD OF A ROUGH EQUILIBRIUM STATE OF SADDLE-FOCUS TYPEMathematics of the USSR-Sbornik, 1970