In this paper, we present new conditions ensuring existence, uniqueness, and Global Asymptotic Stability (GAS) of the equilibrium point for a large class of neural networks. The results are applicable to both symmetric and nonsymmetric interconnection matrices and allow for the consideration of all continuous nondecreasing neuron activation functions. Such functions may be unbounded (but not necessarily surjective), may have infinite intervals with zero slope as in a piece-wise-linear model, or both. The conditions on GAS rely on the concept of Lyapunov Diagonally Stable (or Lyapunov Diagonally Semi-Stable) matrices and are proved by employing a class of Lyapunov functions of the generalized Lur'e-Postnikov type. Several classes of intercon...
This paper presents new necessary and sufficient conditions for absolute stability of asymmetric neu...
Abstract. The dynamic behavior of Cohen-Grossberg neural networks with multiple delays and nonsymmet...
The paper introduces a new approach to analyze the stability of neural network models without using ...
In this paper, we present new conditions ensuring existence, uniqueness, and Global Asymptotic Stabi...
Recent papers in the literature introduced a class of neural networks (NNs) with memristors, named d...
This brief studies the complete stability of neural networks with nonmonotonic piecewise linear acti...
Globally convergent dynamics of a class of neural networks with normal connection matrices is studie...
This paper investigates the existence, uniqueness, and global exponential stability (GES) of the equ...
Globally convergent dynamics of a class of neural networks with normal connection matrices is studie...
The present paper shows that a su±cient condition for the existence of a stable solution to an autor...
In this paper, we continue to explore application of nonsmooth analysis to the study of global asymp...
This paper considers a new class of additive neural networks where the neuron activations are modell...
In a recent paper, Fang and Kincaid proposed an open problem about the relationship between the loca...
This paper presents new necessary and sufficient conditions for absolute stability of asymmetric neu...
International audienceThis note makes several observations on stability and performance verification...
This paper presents new necessary and sufficient conditions for absolute stability of asymmetric neu...
Abstract. The dynamic behavior of Cohen-Grossberg neural networks with multiple delays and nonsymmet...
The paper introduces a new approach to analyze the stability of neural network models without using ...
In this paper, we present new conditions ensuring existence, uniqueness, and Global Asymptotic Stabi...
Recent papers in the literature introduced a class of neural networks (NNs) with memristors, named d...
This brief studies the complete stability of neural networks with nonmonotonic piecewise linear acti...
Globally convergent dynamics of a class of neural networks with normal connection matrices is studie...
This paper investigates the existence, uniqueness, and global exponential stability (GES) of the equ...
Globally convergent dynamics of a class of neural networks with normal connection matrices is studie...
The present paper shows that a su±cient condition for the existence of a stable solution to an autor...
In this paper, we continue to explore application of nonsmooth analysis to the study of global asymp...
This paper considers a new class of additive neural networks where the neuron activations are modell...
In a recent paper, Fang and Kincaid proposed an open problem about the relationship between the loca...
This paper presents new necessary and sufficient conditions for absolute stability of asymmetric neu...
International audienceThis note makes several observations on stability and performance verification...
This paper presents new necessary and sufficient conditions for absolute stability of asymmetric neu...
Abstract. The dynamic behavior of Cohen-Grossberg neural networks with multiple delays and nonsymmet...
The paper introduces a new approach to analyze the stability of neural network models without using ...