Success rate analysis of the response of an excitable laser to periodic perturbations

TL;DR

This paper analyzes how an optically injected semiconductor laser responds to periodic phase perturbations using statistical tools, identifying regimes of synchronization and transitions, with potential applications in generating regular oscillations.

Contribution

It introduces the success rate metric to characterize laser response to periodic perturbations, distinguishing physical and technical delays, and identifying locked and unlocked regimes.

Findings

Success rate effectively differentiates between locked and unlocked regimes.

The analysis separates technical lag from physical and dynamical lag.

The method provides a practical tool for analyzing periodically forced systems.

Abstract

We use statistical tools to characterize the response of an excitable system to periodic perturbations. The system is an optically injected semiconductor laser under pulsed perturbations of the phase of the injected field. We characterize the laser response by counting the number of pulses emitted by the laser, within a time interval, $\Delta$T , that starts when a perturbation is applied. The success rate, SR($\Delta$T), is then defined as the number of pulses emitted in the interval $\Delta$T , relative to the number of perturbations. The analysis of the variation of SR with $\Delta$T allows to separate a constant lag of technical origin and a frequency-dependent lag of physical and dynamical origin. Once the lag is accounted for, the success rate clearly captures locked and unlocked regimes and the transitions between them. We anticipate that the success rate will be a practical tool for analyzing the output of periodically forced systems, particularly when very regular oscillations need to be generated via small periodic perturbations.