Title :
Order reduction using mixed method
Author :
Satakshi ; Mukherjee, S. ; Mittal, R.C.
Author_Institution :
Dept. of Math., Indian Inst. of Technol., Roorkee, Roorkee, India
Abstract :
The proposed method of order reduction of linear time invariant continuous systems deals with determination of reduced system by equating the unit step responses of both the systems. First the denominator polynomial of the reduced system transfer function is found, using the second half equation of Padé approximation method. For finding the numerator polynomial, the unit step responses of both the systems are equated and power series expansion of exponentials occurring in both sides of the equation is done and then by equating the coefficients of all the powers of t, the residues are determined to finally find the numerator polynomial coefficients and reduced system transfer function. Only linear systems of equations are required to be solved in the proposed method.
Keywords :
continuous systems; polynomial approximation; stability; Pade approximation method; denominator polynomial; linear equation systems; linear time invariant continuous systems; mixed method; numerator polynomial coefficients; order reduction; reduced system transfer function; Equations; Order reduction; Pade approximation method; Step response; stability;
Conference_Titel :
IECON 2012 - 38th Annual Conference on IEEE Industrial Electronics Society
Conference_Location :
Montreal, QC
Print_ISBN :
978-1-4673-2419-9
Electronic_ISBN :
1553-572X
DOI :
10.1109/IECON.2012.6388870