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Paper detail

Global Dynamics of Diffusive Hindmarsh-Rose Equations with Memristors

Global dynamics of the diffusive Hindmarsh-Rose equations with memristor as a new proposed model for neuron dynamics are investigated in this paper. We prove the existence and regularity of a global attractor for the solution semiflow through uniform analytic estimates showing the higher-order dissipative property and the asymptotically compact characteristics of the solution semiflow by the approach of Kolmogorov-Riesz theorem. The quantitative bounds of the regions containing this global attractor respectively in the state space and in the regular space are explicitly expressed by the model parameters.

preprint2022arXivOpen access
Yuncheng You
math.APNeurons and Cognition
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Yuncheng You

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