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Paper detail

Robust Instability Analysis with Application to Neuronal Dynamics

This paper is concerned with robust instability analysis of linear feedback systems subject to a dynamic uncertainty. The work is motivated by, and provides a basic foundation for, a more challenging problem of analyzing persistence of oscillations in nonlinear dynamical systems. We first formalize the problem for SISO LTI systems by introducing a notion of the robust instability radius (RIR). We provide a method for calculating the RIR exactly for a certain class of systems and show that it works well for a class of second order systems. This result is applied to the FitzHugh-Nagumo model for neuronal dynamics, and the effectiveness is confirmed by numerical simulations, where we properly care for the change of the equilibrium point.

preprint2021arXivOpen access
Shinji HaraTetsuya IwasakiYutaka Hori
Systems and Controleess.SYNeurons and Cognition
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Shinji HaraTetsuya IwasakiYutaka Hori

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