Identification of time-varying nonlinear systems using Chebyshev polynomials

A new method using the operational properties of the integration and product of the Legendre series is presented for identzfying the unknown parameters of time-varying bilinear systems from the input-output data. This approach is straightforward and convenient for digital computations. One computati

This paper considers the problem of identifying the parameters and initial conditions of systems described by linear dtjierential equations with time-varying coefficients. A new approach is proposed which is based on the idea of using orthogonal functions to represent the input-output data, as well

A finite series expansion method using discrete Legendre orthogonal polynomials (DLOPs) is applied to analyze linear time-varying discrete systems. An effective algorithm is derived to establish a representation which relates the DLOP coeficient vector of a product function to those of its two-comp

This paper is concerned with the identification of linear time-varying systems. The discrete-time state space model of freely vibrating systems is used as an identification model. The focus is placed on identifying successive discrete transition matrices that have the same eigenvalues as the origina

In this work time domain representations for nonlinear time-varying systems are pursued. The analysis is carried out in th,e framework of Schu\*artz's distribution theory. Two approaches are investigated. The first is restricted to semiadditive systems. The other is based on the generalized impulse

## A method of using orthogonal shifted Legendre polynomials for identifying the parameters of a process whose behaviour can be modelled by a linear di$erential equation with time-varying coeficients in the form ofjinite-order polynomials is presented. It is based on the repeated integration of the