Approximation and identification of continuous-time systems

Abstract

An approximation approach to the identification of stable continuous-time, possibly infinite dimensional systems is studied. For this purpose, concrete exponential Leg-endre series methods are proposed and analysed here for the L¹ and L² approximations of continuous-time systems. Rate of approximation results are given for the proposed methods for an important class of delay systems. The proposed exponential Legendre series method for the L₂ approximation has a certain optimal rate of approximation property for this class of delay systems. These results show that exponential Legendre series techniques have promising properties in connection with the L₁ and L₂ identifications of stable continuous-time systems. The proposed L₁ identification method has a direct application to the robust design of control systems.