Dynamical regimes in a class A model of a nonlinear mirror mode-locked laser
- Vladimirov, Andrei G.
- Kovalev, Anton V.
- Viktorov, Evgeny A.
- Rebrova, Natalia
- Huyet, Guillaume
2010 Mathematics Subject Classification
- 78A60 78M35
2008 Physics and Astronomy Classification Scheme
- 42.65.Sf 42.65.Re 42.60.Fc
- Nonlinear mirror mode-locked lasers, delay differential equations, stability analysis, modulational instability, square waves, cavity solitons
Using a simple delay differential equation model we study theoretically the dynamics of a unidirectional class-A ring laser with a nonlinear amplifying loop mirror. We perform analytical linear stability analysis of the CW regimes in the large delay limit and demonstrate that these regimes can be destabilized via modulational and Turing-type instabilities, as well as by a bifurcation leading to the appearance of square-waves. We investigate the formation of square-waves and mode-locked pulses in the system. We show that mode-locked pulses are very asymmetric with exponential decay of the trailing and superexponential growth of the leading edge. We discuss asymmetric interaction of these pulses leading to a formation of harmonic mode-locked regimes.
- Phys. Rev. E, 100 (2019), pp. 012216/1--012216/7, DOI 10.1103/PhysRevE.100.012216 .