A general FitzHugh–Rinzel model, able to describe several neuronal phenomena, is considered. Linear stability and Hopf bifurcations are investigated by means of the spectral equation for the ternary autonomous dynamical system and the analysis is driven by both an admissible critical point and a parameter which characterizes the system.
Hopf bifurcations in dynamics of excitable systems / DE ANGELIS, Monica. - In: RICERCHE DI MATEMATICA. - ISSN 1827-3491. - 73:(2024), pp. 2591-2604. [10.1007/s11587-022-00742-0]
Hopf bifurcations in dynamics of excitable systems
Monica De Angelis
2024
Abstract
A general FitzHugh–Rinzel model, able to describe several neuronal phenomena, is considered. Linear stability and Hopf bifurcations are investigated by means of the spectral equation for the ternary autonomous dynamical system and the analysis is driven by both an admissible critical point and a parameter which characterizes the system.File in questo prodotto:
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