On the persistency of excitation in RBF network identification

Author

Gorinevsky, Dimitry

Author_Institution

Robotics & Autom. Lab., Toronto Univ., Ont., Canada

Volume

2

fYear

1994

fDate

29 June-1 July 1994

Firstpage

1442

Abstract

We consider radial basis function (RBF) network approximation of a multivariate nonlinear mapping as a linear parametric regression problem. Linear recursive identification algorithms applied to this problem are known to converge, provided the regressor vector sequence has the persistency of excitation (PE) property. The contribution of this paper is formulation and proof of PE conditions on the input variables. In the RBF network identification, the regressor vector is a nonlinear function of these input variables. According to the formulated condition, the inputs provide PE, if they belong to domains around the network node centers.

Keywords

approximation theory; feedforward neural nets; function approximation; identification; statistical analysis; vectors; approximation; linear parametric regression; linear recursive identification; multivariate nonlinear mapping; network node centers; persistency of excitation; radial basis function network; regressor vector sequence; Artificial neural networks; Convergence; Educational institutions; Input variables; Intelligent networks; Nonlinear control systems; Radial basis function networks; Recursive estimation; Robotics and automation; Vectors;

fLanguage

English

Publisher

ieee

Conference_Titel

American Control Conference, 1994

Print_ISBN

0-7803-1783-1

Type

conf

DOI

10.1109/ACC.1994.752302

Filename

752302