Globally convergent dynamics of a class of neural networks with normal connection matrices is studied by using the Lyapunov function method and spectral analysis of the connection matrices. It is shown that the networks are absolutely stable if and only if all the real parts of the eigenvalues of the connection matrices are nonpositive. This extends an existing result on symmetric neural networks to a larger class including certain asymmetric networks. Further extension of the present result to certain non-normal case leads naturally to a quasi-normal matrix condition, which may be interpreted as a generalization of the so-called principle of detailed balance for the connection weights or the quasi-symmetry condition that was previously pro...
The symmetry of the neuron interconnection matrix ensures that additive neural networks are complete...
This paper provides a structural condition on the nominal symmetric interconnection matrix of a neur...
This paper deals with a class of large-scale nonlinear dynamical systems, namely the additive neural...
Globally convergent dynamics of a class of neural networks with normal connection matrices is studie...
This paper presents a class of connection patterns for neural networks with necessary and sufficient...
This paper presents new necessary and sufficient conditions for absolute stability of asymmetric neu...
This paper presents new necessary and sufficient conditions for absolute stability of asymmetric neu...
In this paper, we present new conditions ensuring existence, uniqueness, and Global Asymptotic Stabi...
The main result that for a neural circuit of the Hopfield type with a symmetric connection matrix T,...
In this paper, we prove that for a class of nonsymmetric neural networks with connection matrices T ...
The main result obtained in this paper is that for a neural network with interconnection matrix T, i...
In this note the Authors review some recent results on bifurcations and complex dynamics occurring i...
In this letter, the absolute exponential stability result of neural networks with asymmetric connect...
This brief studies the complete stability of neural networks with nonmonotonic piecewise linear acti...
AbstractThe global convergence and asymptotic stability of Hopfield neural networks are known to be ...
The symmetry of the neuron interconnection matrix ensures that additive neural networks are complete...
This paper provides a structural condition on the nominal symmetric interconnection matrix of a neur...
This paper deals with a class of large-scale nonlinear dynamical systems, namely the additive neural...
Globally convergent dynamics of a class of neural networks with normal connection matrices is studie...
This paper presents a class of connection patterns for neural networks with necessary and sufficient...
This paper presents new necessary and sufficient conditions for absolute stability of asymmetric neu...
This paper presents new necessary and sufficient conditions for absolute stability of asymmetric neu...
In this paper, we present new conditions ensuring existence, uniqueness, and Global Asymptotic Stabi...
The main result that for a neural circuit of the Hopfield type with a symmetric connection matrix T,...
In this paper, we prove that for a class of nonsymmetric neural networks with connection matrices T ...
The main result obtained in this paper is that for a neural network with interconnection matrix T, i...
In this note the Authors review some recent results on bifurcations and complex dynamics occurring i...
In this letter, the absolute exponential stability result of neural networks with asymmetric connect...
This brief studies the complete stability of neural networks with nonmonotonic piecewise linear acti...
AbstractThe global convergence and asymptotic stability of Hopfield neural networks are known to be ...
The symmetry of the neuron interconnection matrix ensures that additive neural networks are complete...
This paper provides a structural condition on the nominal symmetric interconnection matrix of a neur...
This paper deals with a class of large-scale nonlinear dynamical systems, namely the additive neural...