论文信息 - Delta high order cumulant-based recursive instrumental variable algorithm

Delta high order cumulant-based recursive instrumental variable algorithm

This letter presents a new recursive high order cumulant-based instrumental variable algorithm. It is based on a modification of the classical least squares estimation and the utilization of the delta operator. The algorithm provides an expression of autoregressive (AR) parameters estimation, in which an additional term appears. This results in an improvement of the convergence of the classical q operator algorithm. Computer simulation results are given to illustrate the behavior of this method.

[1] Hong Fan,et al. Delta Levinson and Schur-type RLS algorithms for adaptive signal processing , 1994, IEEE Trans. Signal Process..

[2] Graham C. Goodwin,et al. Digital control and estimation : a unified approach , 1990 .

[3] D. Kouame,et al. Parametric Estimation: Improvement Of The Rls Algorithm Using A Differential Approach , 1999 .

[4] D. G. Fisher,et al. A factored form of the instrumental variable algorithm , 1993 .

[5] Qiang Li,et al. A delta MYWE algorithm for parameter estimation of noisy AR processes , 1996, IEEE Trans. Signal Process..

[6] Jerry M. Mendel,et al. Lattice algorithms for recursive instrumental variable methods , 1996 .

[7] Benjamin Friedlander,et al. Adaptive IIR algorithms based on high-order statistics , 1989, IEEE Trans. Acoust. Speech Signal Process..

[8] T. Söderström,et al. Instrumental variable methods for system identification , 1983 .

[9] D. Aboutajdine,et al. Fast adaptive algorithms for AR parameters estimation using higher order statistics , 1996, IEEE Trans. Signal Process..

[10] G. Goodwin,et al. High-speed digital signal processing and control , 1992, Proc. IEEE.

[11] Petre Stoica,et al. Comparison of some instrumental variable methods - Consistency and accuracy aspects , 1981, Autom..

[12] Xianda Zhang,et al. Adaptive identification of nonminimum phase ARMA models using higher order cumulants alone , 1996, IEEE Trans. Signal Process..