Title :
IIR Volterra filtering with application to bilinear systems
Author :
Monin, A. ; Salut, G.
Author_Institution :
Lab. d´Anal. et d´Archit. des Syst., CNRS, Toulouse
fDate :
9/1/1996 12:00:00 AM
Abstract :
A new nonlinear filtering technique by means of infinite impulse response (IIR) Volterra functionals is developed. It yields the projection onto the closed class of finite Volterra series with separable kernels of arbitrary degree k. Such an optimal estimator is finitely realizable as a bilinear system with parameters that are computable off line. Moreover, if the original system model is itself bilinear, this computation is finitely recursive through higher moments of degree 2 k. Two simple illustrating examples are developed: (i) estimation of the covariance of the internal white noise driving a linear system and (ii) filtering of a non-Gaussian linear system (driven by a Poisson process). The robustness with respect to the observation noise distribution is finally examined
Keywords :
IIR filters; Volterra series; bilinear systems; covariance analysis; filtering theory; functional equations; nonlinear filters; stochastic processes; white noise; IIR Volterra filtering; IIR Volterra functionals; Poisson process; bilinear systems; covariance estimation; finite Volterra series; infinite impulse response; internal white noise; linear system; nonGaussian linear system; nonlinear filtering; observation noise distribution; optimal estimator; robustness; separable kernels; system model; system parameters; Acoustic noise; Computational complexity; Convolution; Digital filters; Filtering algorithms; Marine vehicles; Multidimensional systems; Nonlinear filters; Nonlinear systems; Time domain analysis;
Journal_Title :
Signal Processing, IEEE Transactions on
