The Bernstein filter-a new class of linear phase filter approximation

Author

Báez-lópez, David

Author_Institution

Dept. de Ingenieria Electron., Univ. de las Americas, Puebla, Mexico

fYear

1991

fDate

14-17 May 1991

Firstpage

704

Abstract

A class of linear phase analog filter approximation based on the Bernstein polynomials is presented. The advantages obtained using this approximation when compared to the Thomson approximation include the fact that the group delay can be varied by varying one of the two parameters available, and in the stopband the magnitude may or may not approach zero as frequency increases. This class of low-pass linear phase transfer functions gives a magnitude which has quasi-maximally flat magnitude. The function has several parameters that allow the function to change the slope in the phase function, the slope in the transition band, the cut-off frequency, and the magnitude value at infinite frequency

Keywords

low-pass filters; polynomials; transfer functions; Bernstein filter; Bernstein polynomials; analog filter; cut-off frequency; group delay; infinite frequency; linear phase filter approximation; low-pass linear phase transfer functions; magnitude value; phase function; quasi-maximally flat magnitude; transition band; Band pass filters; Delay; Digital filters; Filtering theory; Finite impulse response filter; Frequency; Linear approximation; Nonlinear filters; Polynomials; Transfer functions;

fLanguage

English

Publisher

ieee

Conference_Titel

Circuits and Systems, 1991., Proceedings of the 34th Midwest Symposium on

Conference_Location

Monterey, CA

Print_ISBN

0-7803-0620-1

Type

conf

DOI

10.1109/MWSCAS.1991.252015

Filename

252015