Multivariable canonical forms for model reduction of 2-D discrete time systems

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

Starting by the block-controllability form, a normal form for multivariable discrete-time systems is developed. The construction of this normal form is made straight-forward by the introduction of the matrix Schur-Cohn table. It shows a one-to-one (scalar-to-matrix) correspondence with the single-in

This paper deals with the problem of model reduction based on an optimization technique. The objective function being minimized in the impulse energy of the overall system with unity, single-sided and doublesided weightings. A number of properties of the gradient flows associated with the objective

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