Stability and Hopf bifurcation of a neural network model with distributed delays and strong kernel

Abstract: In this paper, the dynamical behaviors of a two-neuron network model with distributed delays and strong kernel are investigated. Considering the mean delay as a bifurcation parameter, explicit algorithms for determining the conditions of Hopf bifurcation are derived. A family of periodic solutions bifurcate from an equilibrium when the bifurcation parameter exceeds a critical value. The direction and stability of the bifurcating periodic solutions are determined in detail by using the theory of normal form and… Show more

“…For scalar equations with a distributed delay, stability, either dependent or independent of the delay distribution, has been studied by several authors [5,6,8,15,35]. A particular case of a system of two equations was explored in [7,16].…”

On the global attractivity of non-autonomous neural networks with a distributed delay

“…For scalar equations with a distributed delay, stability, either dependent or independent of the delay distribution, has been studied by several authors [5,6,8,15,35]. A particular case of a system of two equations was explored in [7,16].…”

On the global attractivity of non-autonomous neural networks with a distributed delay

“…For scalar equations with a distributed delay, stability, either dependent or independent of the delay distribution, has been studied by several authors [5,6,8,15,33]. A particular case of a system of two equations was explored in [7,16].…”

On the global attractivity of non-autonomous neural networks with a distributed delay

Stability and Bifurcation Behavior of a Neuron System with Hyper-Strong Kernel