DocumentCode
1195113
Title
A Q-matrix implementation of the Boxer and Thaler Z-form method
Author
Jackson, M.N. ; Hayward, G.
Volume
33
Issue
7
fYear
1986
fDate
7/1/1986 12:00:00 AM
Firstpage
711
Lastpage
714
Abstract
Application of the impulse invariance technique to 
-transformation of certain Laplace transfer functions can be difficult if the function is not reduced to a constituent partial fraction form. This may be overcome by use of the -form method, originally proposed by Boxer and Thaler [1]. However, the technique often requires a substantial amount of algebraic manipulation. 
-matrix methods are widely employed for such applications involving the bilinear transformation and substantially reduce the required amount of manipulation. This paper presents a general method for the formation and application of a -form -matrix.
-transformation of certain Laplace transfer functions can be difficult if the function is not reduced to a constituent partial fraction form. This may be overcome by use of the -form method, originally proposed by Boxer and Thaler [1]. However, the technique often requires a substantial amount of algebraic manipulation. -matrix methods are widely employed for such applications involving the bilinear transformation and substantially reduce the required amount of manipulation. This paper presents a general method for the formation and application of a -form -matrix.Keywords
Matrices; Polynomials; Transfer functions; Z transforms; Bridges; Matrices; Polynomials; Power generation; Sampling methods; Transfer functions;
fLanguage
English
Journal_Title
Circuits and Systems, IEEE Transactions on
Publisher
ieee
ISSN
0098-4094
Type
jour
DOI
10.1109/TCS.1986.1085972
Filename
1085972
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