Litcius/Paper detail

Canard-induced mixed mode oscillations as a mechanism for the Bonhoeffer-van der Pol circuit under parametric perturbation

Yue Yu, Cong Zhang, Zhenyu Chen, Zhengdi Zhang

2021Circuit World14 citationsDOI

Abstract

Purpose This paper aims to investigate the singular Hopf bifurcation and mixed mode oscillations (MMOs) in the perturbed Bonhoeffer-van der Pol (BVP) circuit. There is a singular periodic orbit constructed by the switching between the stable focus and large amplitude relaxation cycles. Using a generalized fast/slow analysis, the authors show the generation mechanism of two distinct kinds of MMOs. Design/methodology/approach The parametric modulation can be used to generate complicated dynamics. The BVP circuit is constructed as an example for second-order differential equation with periodic perturbation. Then the authors draw the bifurcation parameter diagram in terms of a containing two attractive regions, i.e. the stable relaxation cycle and the stable focus. The transition mechanism and characteristic features are investigated intensively by one-fast/two-slow analysis combined with bifurcation theory. Findings Periodic perturbation can suppress nonlinear circuit dynamic to a singular periodic orbit. The combination of these small oscillations with the large amplitude oscillations that occur due to canard cycles yields such MMOs. The results connect the theory of the singular Hopf bifurcation enabling easier calculations of where the oscillations occur. Originality/value By treating the perturbation as the second slow variable, the authors obtain that the MMOs are due to the canards in a supercritical case or in a subcritical case. This study can reveal the transition mechanism for multi-time scale characteristics in perturbed circuit. The information gained from such results can be extended to periodically perturbed circuits.

Topics & Concepts

BifurcationVan der Pol oscillatorSingular perturbationNonlinear systemHopf bifurcationControl theory (sociology)Parametric statisticsAmplitudeMathematicsBifurcation diagramElectronic circuitPerturbation (astronomy)Mathematical analysisPhysicsComputer scienceQuantum mechanicsControl (management)Artificial intelligenceStatisticsstochastic dynamics and bifurcationNonlinear Dynamics and Pattern FormationChaos control and synchronization