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Multidimensional Systems and Signal Processing

, Volume 30, Issue 1, pp 493–502 | Cite as

On minor prime factorizations for multivariate polynomial matrices

  • Jiancheng GuanEmail author
  • Weiqing Li
  • Baiyu Ouyang
Article
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Abstract

Multivariate polynomial matrix factorizations have been widely investigated during the past years due to the fundamental importance in the areas of multidimensional systems and signal processing. In this paper, minor prime factorizations for multivariate polynomial matrices are studied. We give a necessary and sufficient condition for the existence of a minor left prime factorization for a multivariate polynomial matrix. This result is a generalization of a theorem in Wang and Kwong (Math Control Signals Syst 17(4):297–311, 2005). On the basis of this result and a method in Fabiańska and Quadrat (Radon Ser Comp Appl Math 3:23–106, 2007), we give an algorithm to decide if a multivariate polynomial matrix has minor left prime factorizations and compute one if they exist.

Keywords

Multidimensional systems Multivariate polynomial matrices Matrix factorizations Minor prime factorizations 
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Notes

Acknowledgements

The authors would like to thank the reviewers whose valuable and constructive comments helped to improve this paper.

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© Springer Science+Business Media, LLC, part of Springer Nature 2018

Authors and Affiliations

  1. 1.College of Mathematics and Computer Science, Key Laboratory of High Performance Computing and Stochastic Information Processing (Ministry Of Education of China)Hunan Normal UniversityChangshaChina

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