Analysis of a first-order delay differential-delay equation containing two delays
- 1 September 1989
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review A
- Vol. 40 (6) , 3420-3428
- https://doi.org/10.1103/physreva.40.3420
Abstract
An experimental and numerical analysis of the behavior of a two-delay differential equation is presented. It is shown that much of the system’s behavior can be related to the stability behavior of the underlying linearized modes. A new phenomenon, mode crossing, is explored.Keywords
This publication has 16 references indexed in Scilit:
- Statistics and dimension of chaos in differential delay systemsPhysical Review A, 1987
- Study of a high-dimensional chaotic attractorJournal of Statistical Physics, 1986
- Periodicity windows in a dynamical system with a delayed feedbackPhysical Review A, 1986
- Analysis of a delay-differential equation in optical bistabilityPhysical Review A, 1986
- Mode description of the dynamical evolution of an acousto-optic bistable deviceIEEE Journal of Quantum Electronics, 1985
- Route to chaos in an acousto-optic bistable devicePhysical Review A, 1985
- Alternate paths to chaos in optical bistabilityPhysical Review A, 1983
- Successive Higher-Harmonic Bifurcations in Systems with Delayed FeedbackPhysical Review Letters, 1982
- Bifurcations to chaos in optical bistabilityPhysical Review A, 1982
- Observation of Chaos in Optical BistabilityPhysical Review Letters, 1981