论文信息 - Nonlinear output regulation based on RBF neural network approximation

Nonlinear output regulation based on RBF neural network approximation

The regulator equations arising from the nonlinear output regulation problem are a set of mixed partial differential and algebraic equations. Due to the nonlinear nature, it is difficult to obtain the exact solution of the regulator equations. In this paper, an approximation method based on a class of radial basis function (RBF) neural networks was investigated for solving the regulator equations. It is shown that the RBF neural networks can solve the regulator equations up to a prescribed arbitrarily small error, and this small error can be translated into a guaranteed steady-state tracking error for the closed-loop system. Simulation studies, which are conducted to compare with MNN method, show that the RBF NN method has good properties such as rapid training speed and overcoming local minimal value.

[1] Simon Haykin,et al. Neural Networks: A Comprehensive Foundation (3rd Edition) , 2007 .

[2] Simon Haykin,et al. Neural Networks: A Comprehensive Foundation , 1998 .

[3] E. Davison. The robust control of a servomechanism problem for linear time-invariant multivariable systems , 1976 .

[4] Jie Huang,et al. Approximate nonlinear output regulation based on the universal approximation theorem , 2000 .

[5] John Moody,et al. Fast Learning in Networks of Locally-Tuned Processing Units , 1989, Neural Computation.

[6] S. Sanders,et al. Controlling Non-Minimum Phase Nonlinear Systems - The Inverted Pendulum on a Cart Example , 1993, 1993 American Control Conference.

[7] B. Francis. The linear multivariable regulator problem , 1976, 1976 IEEE Conference on Decision and Control including the 15th Symposium on Adaptive Processes.

[8] C. Desoer,et al. Linear Time-Invariant Robust Servomechanism Problem: A Self-Contained Exposition , 1980 .

[9] A. Isidori,et al. Output regulation of nonlinear systems , 1990 .

[10] W. Rugh,et al. Stabilization on zero-error manifolds and the nonlinear servomechanism problem , 1992 .

[11] Jie Huang,et al. On a nonlinear multivariable servomechanism problem , 1990, Autom..

[12] Bruce A. Francis,et al. The internal model principle of control theory , 1976, Autom..

[13] W. Rugh,et al. An approximation method for the nonlinear servomechanism problem , 1992 .