AbstractThis paper investigates the dynamics of a class of recurrent neural networks where the neural activations are modeled by discontinuous functions. Without presuming the boundedness of activation functions, the sufficient conditions to ensure the existence, uniqueness, global exponential stability and global convergence of state equilibrium point and output equilibrium point are derived, respectively. Furthermore, under certain conditions we prove that the system is convergent globally in finite time. The analysis in the paper is based on the properties of M-matrix, Lyapunov-like approach, and the theories of differential equations with discontinuous right-hand side as introduced by Filippov. The obtained results extend previous works...
The paper considers a large class of additive neural networks where the neuron activations are model...
This paper considers the stability problem of multiple equilibria for delayed neural networks with d...
In this paper, by using the continuation theorem of coincidence degree theory, M-matrix theory and c...
The paper considers a class of additive neural networks where the neuron activations are modeled by ...
This paper considers a new class of additive neural networks where the neuron activations are model...
In this paper, we discuss the coexistence and dynamical behaviors of multiple equilibrium points for...
The paper considers a general class of neural networks possessing discontinuous neuron activations a...
Delayed neural networks with periodic coefficients and discontinuous and/or unbounded activation fun...
This paper is concerned with stability analysis of multiple equilibria for recurrent neural networks...
This paper addresses the problem of complete stability of delayed recurrent neural networks with a g...
This paper introduces a general class of neural networks with arbitrary constant delays in the neuro...
This paper addresses the problem of coexistence and dynamical behaviors of multiple equilibria for c...
This dissertation addresses the new models in mathematical neuroscience: artificial neural networks,...
This paper is concerned with the problem of coexistence and dynamical behaviors of multiple equilibr...
[[abstract]]A global stability analysis of a particular class of recurrent neural networks with time...
The paper considers a large class of additive neural networks where the neuron activations are model...
This paper considers the stability problem of multiple equilibria for delayed neural networks with d...
In this paper, by using the continuation theorem of coincidence degree theory, M-matrix theory and c...
The paper considers a class of additive neural networks where the neuron activations are modeled by ...
This paper considers a new class of additive neural networks where the neuron activations are model...
In this paper, we discuss the coexistence and dynamical behaviors of multiple equilibrium points for...
The paper considers a general class of neural networks possessing discontinuous neuron activations a...
Delayed neural networks with periodic coefficients and discontinuous and/or unbounded activation fun...
This paper is concerned with stability analysis of multiple equilibria for recurrent neural networks...
This paper addresses the problem of complete stability of delayed recurrent neural networks with a g...
This paper introduces a general class of neural networks with arbitrary constant delays in the neuro...
This paper addresses the problem of coexistence and dynamical behaviors of multiple equilibria for c...
This dissertation addresses the new models in mathematical neuroscience: artificial neural networks,...
This paper is concerned with the problem of coexistence and dynamical behaviors of multiple equilibr...
[[abstract]]A global stability analysis of a particular class of recurrent neural networks with time...
The paper considers a large class of additive neural networks where the neuron activations are model...
This paper considers the stability problem of multiple equilibria for delayed neural networks with d...
In this paper, by using the continuation theorem of coincidence degree theory, M-matrix theory and c...