Nonlinear system modeling based on constrained Volterra series estimates

Abstract

A simple nonlinear system modeling algorithm designed to work with limited a priori knowledge and short data records, is examined. It creates an empirical Volterra series-based model of a system using an lq-constrained least squares algorithm with q≥ 1. If the system m( · ) is a continuous and bounded map with a finite memory no longer than some known τ, then (for a D parameter model and for a number of measurements N) the difference between the resulting model of the system and the best possible theoretical one is guaranteed to be of order N-1 D, even for D≥ N. The performance of models obtained for q=1,1.5 and 2 is tested on the Wiener-Hammerstein benchmark system. The results suggest that the models obtained for q>1 are better suited to characterize the nature of the system, while the sparse solutions obtained for q=1 yield smaller error values in terms of input-output behavior.