DocumentCode
1171633
Title
The MUCROMAF polynomials: An approach to the maximally flat approximation of RC active filters with low sensitivity
Author
Premoli, Amedeo
Volume
20
Issue
1
fYear
1973
fDate
1/1/1973 12:00:00 AM
Firstpage
77
Lastpage
80
Abstract
The MUltiple Critical ROot MAximally Flat (MUCROMAF) polynomials are defined. Their behavior is maximally flat at the origin (as the classical Butterworth polynomials), while the multiplicity of the critical root pair (the nearest to 
-axis) is higher than one: then the polynomial degree is higher and the critical root pair 
-factor is lower than those of the analogous Butterworth polynomials. Thus they are useful to approximate the RC active-filter pattern without finite transmission zeros and with low sensitivity.
-axis) is higher than one: then the polynomial degree is higher and the critical root pair -factor is lower than those of the analogous Butterworth polynomials. Thus they are useful to approximate the RC active-filter pattern without finite transmission zeros and with low sensitivity.Keywords
Active filters, RC; Active networks; Low-pass filters; Maximally-flat-amplitude filters; Active filters; Circuit stability; Circuit synthesis; Filtering theory; Low pass filters; Manufacturing; Matrix converters; Polynomials; Q factor; Tree graphs;
fLanguage
English
Journal_Title
Circuit Theory, IEEE Transactions on
Publisher
ieee
ISSN
0018-9324
Type
jour
DOI
10.1109/TCT.1973.1083608
Filename
1083608
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