Please use this identifier to cite or link to this item:
|Title:||Pipelined recursive filter with minimum order augmentation||Authors:||Lim, Y.C.
|Issue Date:||Jul-1992||Citation:||Lim, Y.C., Liu, Bede (1992-07). Pipelined recursive filter with minimum order augmentation. IEEE Transactions on Signal Processing 40 (7) : 1643-1651. ScholarBank@NUS Repository. https://doi.org/10.1109/78.143436||Abstract:||Pipelining is an efficient way for improving the average computation speed of an arithmetic processor. However, for an M-stage pipeline, the result of a given operation is available only M clock periods after initiating the computation. In a recursive filter, the computation of y(n) cannot be initiated before the computations of y(n - 1) through y(n - N) are completed. H. B. Voelcker and E. E. Hartquist (1970) and P. M. Kogge and H. S. Stone (1973) independently devised augmentation techniques for resolving the dependence problem in the computation of y(n). However, the augmentation required to ensure stability may be excessively high, resulting in a very complex numerator realization. A technique which results in a minimum order augmentation is presented here. The complexity of the resulting filter design is very much lower. Various pipelining architectures are presented. It is demonstrated by an example that when compared to the prototype filter, the augmented filter has a lower coefficient sensitivity and better roundoff noise performance.||Source Title:||IEEE Transactions on Signal Processing||URI:||http://scholarbank.nus.edu.sg/handle/10635/80988||ISSN:||1053587X||DOI:||10.1109/78.143436|
|Appears in Collections:||Staff Publications|
Show full item record
Files in This Item:
There are no files associated with this item.
checked on Sep 13, 2021
WEB OF SCIENCETM
checked on Sep 6, 2021
checked on Sep 16, 2021
Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.