Chaotic synchronization and control in nonlinear-coupled Hindmarsh--Rose neural systems
From MaRDI portal
Publication:2497688
DOI10.1016/j.chaos.2005.08.075zbMath1095.92020OpenAlexW2031642808MaRDI QIDQ2497688
Publication date: 4 August 2006
Published in: Chaos, Solitons and Fractals (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.chaos.2005.08.075
Neural biology (92C20) Dynamical systems in biology (37N25) Application models in control theory (93C95) Strange attractors, chaotic dynamics of systems with hyperbolic behavior (37D45)
Related Items
FPGA implementation of motifs-based neuronal network and synchronization analysis ⋮ Optimal exponential synchronization of general chaotic delayed neural networks: an LMI approach ⋮ Bursting synchronization of Hind-Rose system based on a single controller ⋮ On the Darboux integrability of the Hindmarsh-Rose burster ⋮ Exact synchronization of noisy bursting neurons with coupling delays ⋮ Global synchronization of two Ghostburster neurons via active control ⋮ How the self-coupled neuron can affect the chaotic synchronization of network ⋮ Excitation of a Group of Two Hindmarsh – Rose Neurons with a Neuron-Generated Signal ⋮ Dynamics of a neuron model in different two-dimensional parameter-spaces ⋮ Phase synchronization in fractional differential chaotic systems ⋮ No-chattering sliding mode control chaos in Hindmarsh-Rose neurons with uncertain parameters ⋮ How single node dynamics enhances synchronization in neural networks with electrical coupling ⋮ LAG SYNCHRONIZATION OF BURSTING NEURON SYSTEMS WITH STOCHASTIC PERTURBATION VIA ADAPTIVE FEEDBACK CONTROL ⋮ Synchronization of FitzHugh-Nagumo systems in EES via \(H_{\infty}\) variable universe adaptive fuzzy control ⋮ Lag synchronization of multiple identical Hindmarsh-Rose neuron models coupled in a ring structure ⋮ Numerical stability of chaotic synchronization using a nonlinear coupling function ⋮ On analytical justification of phase synchronization in different chaotic systems ⋮ Unidirectional synchronization of Hodgkin-Huxley neurons exposed to ELF electric field ⋮ Chaotic bursting lag synchronization of Hindmarsh-Rose system via a single controller ⋮ Spatiotemporal pattern formation in a ring of Chua's oscillators ⋮ Asynchronous Chaos and Bifurcations in a Model of Two Coupled Identical Hindmarsh – Rose Neurons
Cites Work
- Chaotic synchronization based on stability criterion of linear systems
- Phase synchronization in two coupled chaotic neurons
- Control of chaotic solutions of the Hindmarsh-Rose equations
- Control of chaotic neural networks based on contraction mappings
- An open-plus-closed-loop (OPCL) control of complex dynamic systems
- Controlling chaos
- Synchronization in chaotic systems
