An iterative method for simplification of discrete systems

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 proposed method utilizes a frequency-domain optimization technique to find the optimal simplified z-transfer functions for a given higher order s-transfer function. The optimum values for the parameters of the prespecified reduced order discrete model are obtained as a result of minimizing the s

An iterative process based on the wave concept is presented. This technique enables the rigorous treatment of radiating structures modeled by the finite element method ( ) FEM while preserving its computational efficiency. The coupling of the FEM model with the open region modeled by the integral eq

We consider nonlinear semi-discrete problems that derive by reaction diffusion systems of partial differential equations, when finite difference methods or Faedo Galerkin methods are used for spatial discretization. The aim of this article is to give sufficient conditions for the contractivity of th