Title :
Step-invariant transform from z- to s-domain: a general framework
Author :
NÉmeth, JÓzsef G. ; KollÁr, IstvÁn
Author_Institution :
Dept. of Meas. & Inf. Syst., Budapest Univ. of Technol. & Econ., Hungary
Abstract :
The conversion from discrete-time to continuous-time models is sometimes quite troublesome. This paper answers related pending questions concerning z-domain poles at the origin, and relating them to s-domain models with time delay. Special attention is devoted to the trade-off between fractional delay and direct feed-through. The paper places these questions into a general framework of model mapping between z-domain transfer functions and s-domain transfer functions, maybe with input delay. An algorithm to convert z-domain models with a pole at the origin is explained. A MATLAB routine has been implemented. The routine allows to execute the conversion either by defining the delay or the allowable direct feed-through. This routine is made available through the WWW
Keywords :
Bode diagrams; Laplace transforms; Nyquist criterion; continuous time systems; delay systems; discrete time systems; identification; modelling; poles and zeros; step response; transfer functions; transient response; Bode diagrams; MATLAB routine; Nyquist criterion; ZOH transform; continuous-time models; delay system; direct feedthrough; discrete-time models; fractional delay; identification; impulse response; inverted Laplace transform; model mapping; partial fractions; s-domain models; s-domain transfer functions; step response; step-invariant transform; time delay; z-domain poles; z-domain transfer functions; Delay effects; Delay systems; Discrete transforms; Information systems; MATLAB; Mathematical model; Poles and zeros; Sampling methods; Transfer functions; World Wide Web;
Conference_Titel :
Instrumentation and Measurement Technology Conference, 2000. IMTC 2000. Proceedings of the 17th IEEE
Conference_Location :
Baltimore, MD
Print_ISBN :
0-7803-5890-2
DOI :
10.1109/IMTC.2000.848862
