This article investigates the local stability and local convergence of a class of neural network (NN) controllers with error integrals as inputs for reference tracking. It is formally proved that if the input of the NN controller consists exclusively of error terms, the control system shows a non-zero steady-state error for any constant reference except for one specific point, for both single-layer and multi-layer NN controllers. It is further proved that adding error integrals to the input of the (single- and multi-layers) NN controller is one sufficient way to remove the steady-state error for any constant reference. Due to the nonlinearity of the NN controllers, the NN control systems are linearized at the equilibrium points. We provide ...
In this paper, the power system with an excitation controller is represented as a class of large-sca...
A neural network enhanced proportional, integral and derivative (PID) controller is presented that c...
Most industrial processes contain nonlinearities, making them difficult to control. To overcome thi...
This paper investigates the local stability and convergence for a class of neural network controller...
This paper presents a novel state-feedback control scheme for the tracking control of a class of mul...
Neural networks are expressive function approimators that can be employed for state estimation in co...
This paper deals with a class of large-scale nonlinear dynamical systems, namely the additive neural...
This paper is devoted to studying both the global and local stability of dynamical neural networks. ...
We present a recurrent neural-network (RNN) controller designed to solve the tracking problem for co...
In this paper, the power system with an excitation controller is represented as a class of large-sca...
In this paper we present a class of nonlinear neural network models and an associated learning algor...
AbstractBased on a new paradigm of neural networks consisting of neurons with local memory (NNLM), w...
[[abstract]]This paper presents a stability method which is based on the stability condition of slid...
The ever increasingly tight control performance requirement of modern mechanical systems often force...
Through the use of high-gain observer to estimate the unmeasurable system states, neural networks (N...
In this paper, the power system with an excitation controller is represented as a class of large-sca...
A neural network enhanced proportional, integral and derivative (PID) controller is presented that c...
Most industrial processes contain nonlinearities, making them difficult to control. To overcome thi...
This paper investigates the local stability and convergence for a class of neural network controller...
This paper presents a novel state-feedback control scheme for the tracking control of a class of mul...
Neural networks are expressive function approimators that can be employed for state estimation in co...
This paper deals with a class of large-scale nonlinear dynamical systems, namely the additive neural...
This paper is devoted to studying both the global and local stability of dynamical neural networks. ...
We present a recurrent neural-network (RNN) controller designed to solve the tracking problem for co...
In this paper, the power system with an excitation controller is represented as a class of large-sca...
In this paper we present a class of nonlinear neural network models and an associated learning algor...
AbstractBased on a new paradigm of neural networks consisting of neurons with local memory (NNLM), w...
[[abstract]]This paper presents a stability method which is based on the stability condition of slid...
The ever increasingly tight control performance requirement of modern mechanical systems often force...
Through the use of high-gain observer to estimate the unmeasurable system states, neural networks (N...
In this paper, the power system with an excitation controller is represented as a class of large-sca...
A neural network enhanced proportional, integral and derivative (PID) controller is presented that c...
Most industrial processes contain nonlinearities, making them difficult to control. To overcome thi...