Propagation of chaos in mean field networks of FitzHugh-Nagumo neurons

Colombani, Laetitia; Bris, Pierre Le

doi:10.46298/mna.9748

Cited by 3 publications

(1 citation statement)

References 28 publications

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“…granular type media diffusions [8]). See also the recent paper of [20], where the authors studies a uniform propagation of chaos on the FitzHugh-Nagumo diffusive model.…”

Section: Link With the Literaturementioning

confidence: 99%

Multivariate Hawkes processes on inhomogeneous random graphs

Agathe-Nerine¹

2022

Stochastic Processes and their Applications

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“…granular type media diffusions [8]). See also the recent paper of [20], where the authors studies a uniform propagation of chaos on the FitzHugh-Nagumo diffusive model.…”

Section: Link With the Literaturementioning

confidence: 99%

Multivariate Hawkes processes on inhomogeneous random graphs

Agathe-Nerine¹

2022

Stochastic Processes and their Applications

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Numerical analysis of coupled dynamical biological networks: Modeling electrical information exchange among nerve cells using finite volume method

Saleem,

Alade,

Saqib

et al. 2024

AIP Advances

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An innovative approach to modeling the conduction of electrical impulses via intricate neuronal structures is introduced in this paper, which offers a theoretical and computational examination of parameter estimation in a coupled FitzHugh–Nagumo model. With this goal in mind, we present a finite volume approach to solving the FitzHugh–Nagumo model and check the numerical method’s accuracy against previous findings. To further assess and contrast the efficacy and precision of the model’s outputs, a finite difference formulation is incorporated. To clarify the basic qualitative properties of the inhibitor–activator mechanism intrinsic to the coupled FitzHugh–Nagumo model, the analysis uses dynamical system approaches and linear stability analysis. The results show that the suggested schemes are very accurate, with conditional stability, reaching fourth-order spatial and second-order temporal precision. The results are given in both tabular and graphical forms. According to numerical results, the suggested finite volume method outperforms the finite difference method in accurately and efficiently solving the nonlinear coupled FitzHugh–Nagumo model. Neuronal activity and electrical communication are complex biological systems with a lot of investigated nonlinear differential equations; this research helps us understand more about these topics.

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Wasserstein contraction for the stochastic Morris-Lecar neuron model

Herda,

Monmarché,

Perthame

2024

KRM

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Neuron models have attracted a lot of attention recently, both in mathematics and neuroscience. We are interested in studying long-time and large-population emerging properties in a simplified toy model. From a mathematical perspective, this amounts to studying the long-time behaviour of a degenerate reflected diffusion process. Using coupling arguments, the flow is proven to be a contraction of the Wasserstein distance for long times, which implies the exponential relaxation toward a (non-explicit) unique globally attractive equilibrium distribution. The result is extended to a McKean-Vlasov type non-linear variation of the model, when the mean-field interaction is sufficiently small. The ergodicity of the process results from a combination of deterministic contraction properties and local diffusion, the noise being sufficient to drive the system away from non-contractive domains.

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Propagation of chaos in mean field networks of FitzHugh-Nagumo neurons

Cited by 3 publications

References 28 publications

Multivariate Hawkes processes on inhomogeneous random graphs

Multivariate Hawkes processes on inhomogeneous random graphs

Numerical analysis of coupled dynamical biological networks: Modeling electrical information exchange among nerve cells using finite volume method

Wasserstein contraction for the stochastic Morris-Lecar neuron model

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