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Abstract
The best least squares approximation of a matrix, typically e.g. characterising gain factors in narrowband problems, by a unitary one is addressed by the Procrustes problem. Here, we extend this idea to the case of matrices of analytic functions, and characterise a broadband equivalent to the narrowband approach which we term the polynomial Procrustes problem. Its solution relies on an analytic singular value decomposition, and for the case of spectrally majorised, distinct singular values, we demonstrate the application of a suitable algorithm to three problems via simulations: (i) time delay estimation, (ii) paraunitary matrix completion, and (iii) general paraunitary approximations.
Original language | English |
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Article number | 100318 |
Number of pages | 10 |
Journal | Science Talks |
Early online date | 27 Feb 2024 |
DOIs | |
Publication status | E-pub ahead of print - 27 Feb 2024 |
Keywords
- paraunitary matrices
- least squares approximation
- filter bank design
- analytic singular value decoposition
- matrix completion
- delay estimation
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Dive into the research topics of 'Paraunitary approximation of matrices of analytic functions - the polynomial procrustes problem'. Together they form a unique fingerprint.Projects
- 1 Finished
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Signal Processing in the Information Age (UDRC III)
Weiss, S. (Principal Investigator) & Stankovic, V. (Co-investigator)
EPSRC (Engineering and Physical Sciences Research Council)
1/07/18 → 31/03/24
Project: Research
Research output
- 1 Article
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On properties and structure of the analytic singular value decomposition
Weiss, S., Proudler, I. K., Barbarino, G., Pestana, J. & McWhirter, J. G., 8 May 2024, In: IEEE Transactions on Signal Processing. 72, p. 2260-2275 16 p.Research output: Contribution to journal › Article › peer-review
Open AccessFile7 Citations (Scopus)170 Downloads (Pure)