liu.seSearch for publications in DiVA
Change search
ReferencesLink to record
Permanent link

Direct link
On frequency-domain implementation of digital FIR filters
Linköping University, Department of Electrical Engineering, Communication Systems. Linköping University, Faculty of Science & Engineering.
Linköping University, Department of Electrical Engineering, Computer Engineering. Linköping University, Faculty of Science & Engineering.ORCID iD: 0000-0003-3470-3911
2015 (English)In: IEEE International Conference on Digital Signal Processing (DSP), 2015, IEEE , 2015, 315-318 p.Conference paper (Refereed)
Abstract [en]

This paper considers frequency-domain implementation of finite-length impulse response filters. In practical fixed-point arithmetic implementations, the overall system corresponds to a time-varying system which can be represented with either a multirate filter bank, and the corresponding distortion and aliasing functions, or a periodic time-varying impulse-response representation or, equivalently, a set of impulse responses and the corresponding frequency responses. The paper provides systematic derivations and analyses of these representations along with design examples. These representations are useful when analyzing the effect of coefficient quantizations as well as the use of shorter DFT lengths than theoretically required.

Place, publisher, year, edition, pages
IEEE , 2015. 315-318 p.
National Category
Signal Processing
Identifiers
URN: urn:nbn:se:liu:diva-124002DOI: 10.1109/ICDSP.2015.7251883ISBN: 9781479980581OAI: oai:DiVA.org:liu-124002DiVA: diva2:894991
Conference
IEEE International Conference on Digital Signal Processing, Singapore, 21-24 July 2015
Available from: 2016-01-18 Created: 2016-01-18 Last updated: 2016-01-25

Open Access in DiVA

No full text

Other links

Publisher's full text

Search in DiVA

By author/editor
Johansson, HåkanGustafsson, Oscar
By organisation
Communication SystemsFaculty of Science & EngineeringComputer Engineering
Signal Processing

Search outside of DiVA

GoogleGoogle Scholar
The number of downloads is the sum of all downloads of full texts. It may include eg previous versions that are now no longer available

Altmetric score

Total: 419 hits
ReferencesLink to record
Permanent link

Direct link