Samenvatting
Wiener systems are nonlinear dynamical systems, consisting of a linear dynamical system and a static nonlinear system in a series connection. Existing results for analysis and identification of Wiener systems assume zero initial conditions. In this paper, we consider the response of a Wiener system to initial conditions only, i.e., we consider autonomous Wiener systems. Our main result is a proof that the behavior of an autonomous Wiener system with a polynomial nonlinearity is included in the behavior of a finite-dimensional linear system. The order of the embedding linear system is at most [Formula presented] – the number of combinations with repetitions of d elements out of n elements – where n is the order of the linear subsystem and d is the degree of the nonlinearity. The relation between the eigenvalues of the embedding linear system and the linear subsystem is given by a rank-1 factorization of a symmetric d-way tensor. As an application of the result, we outline a procedure for exact (deterministic) identification of autonomous Wiener systems.
Originele taal-2 | English |
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Artikelnummer | 108601 |
Aantal pagina's | 5 |
Tijdschrift | Automatica |
Volume | 110 |
DOI's | |
Status | Published - 1 dec 2019 |