Hilbert transform and gain/phase error bounds for rational functions

Author

Anderson, Brian D O ; Green, Michael

Author_Institution

Dept. of Syst. Eng., Australian Nat. Univ., Canberra, ACT, Australia

Volume

35

Issue

5

fYear

1988

fDate

5/1/1988 12:00:00 AM

Firstpage

528

Lastpage

535

Abstract

It is well known that a function analytic in the right-half plane can be constructed from its real part alone, or (modulo an additive constant) from its imaginary part alone via the Hilbert transform. It is also known that a stable phase-transfer function can be reconstructed from its gain alone, or (modulo a multiplicative constant) from its phase alone, using the Bode gain/phase relations. The question of the continuity of these constructions, for example, whether small phase errors in the calculated transfer function, is considered in the context of rational functions. The bound obtained depends on the McMillan degree of function

Keywords

network analysis; system theory; transforms; Bode gain/phase relations; Hilbert transform; McMillan degree of function; additive constant; gain alone; gain error bounds; multiplicative constant; phase error bounds; phase-transfer function; rational functions; real part alone; right-half plane; small phase errors; Fourier transforms; Frequency; Gain measurement; Image analysis; Image reconstruction; Network synthesis; Phase measurement; Signal design; Signal synthesis; Transfer functions;

fLanguage

English

Journal_Title

Circuits and Systems, IEEE Transactions on

Publisher

ieee

ISSN

0098-4094

Type

jour

DOI

10.1109/31.1780

Filename

1780