A stable residue method for model reduction of discrete systems

A new methodfor the model reduction of linear discrete stable systems in Z-transfer functions is presented. First, a set of parameters is defined, whose values uniquely determine the given system. Then an always stable reduced approximant is obtained by neglecting the parameters which do not contrib

A method to derive stable reduced-order models for a stable discrete-time invariant system is presented. The method is based on a unit circle stability criterion. This criterion is the z-plane equivalent of a stability criterion for continuous time systems and is proven by using the bilinear transfo

ABSTFCACK A new combined time and frequency domain method for the model reduction of discrete systems in z-transfer functions is presented. First, the z-transfer functions are transformed into the w-domain by the bilinear transformation, z = (1 f w)/(l -w). Then, four model reduction methods-Routh a

A two-step iterative method (1,2) f or a reduction in the order of linear continuous- time systems, given in the state equation or the transfer function, is extended to reduce discretetime systems. The method requires the optimization of the residues and eigenvalues (or poles) belonging to an object

The normal form derived by Mansour [I] for single-input / single-output, time-invariant, linear discrete systems will be extended to the multivariable case. An algorithm will be used to achieve simple computation of this form starting with the Luenberger first canonical form. The construction of thi