A real representation of complex polynomial matrices in the framework of conjugate product

Ai Guo Wu; Hui Zhen Wang

doi:10.1080/00207160.2018.1430787

A real representation of complex polynomial matrices in the framework of conjugate product

Ai Guo Wu^*
, Hui Zhen Wang

^*Corresponding author for this work

Harbin Institute of Technology Shenzhen

Research output: Contribution to journal › Article › peer-review

2 Scopus citations

Abstract

A real representation of complex polynomial matrices in the framework of conjugate product is first proposed, and some interesting properties of the proposed real representation are given. With the real representations as tools, alternative proofs for some properties of conjugate product are given. In addition, the concept of real determinant is proposed for complex polynomial matrices in the framework of conjugate product, and based on the real determinant the invertibility in the framework of conjugate product is investigated. These results imply that the proposed real representation has potential applications in the further investigation of conjugate product.

Original language	English
Pages (from-to)	1567-1575
Number of pages	9
Journal	International Journal of Computer Mathematics
Volume	96
Issue number	8
DOIs	https://doi.org/10.1080/00207160.2018.1430787
State	Published - 3 Aug 2019
Externally published	Yes

Keywords

11C08
Real representation
conjugate product
invertible matrices
polynomial matrices
real determinant

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10.1080/00207160.2018.1430787

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title = "A real representation of complex polynomial matrices in the framework of conjugate product",

abstract = "A real representation of complex polynomial matrices in the framework of conjugate product is first proposed, and some interesting properties of the proposed real representation are given. With the real representations as tools, alternative proofs for some properties of conjugate product are given. In addition, the concept of real determinant is proposed for complex polynomial matrices in the framework of conjugate product, and based on the real determinant the invertibility in the framework of conjugate product is investigated. These results imply that the proposed real representation has potential applications in the further investigation of conjugate product.",

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author = "Wu, \{Ai Guo\} and Wang, \{Hui Zhen\}",

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AU - Wang, Hui Zhen

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N2 - A real representation of complex polynomial matrices in the framework of conjugate product is first proposed, and some interesting properties of the proposed real representation are given. With the real representations as tools, alternative proofs for some properties of conjugate product are given. In addition, the concept of real determinant is proposed for complex polynomial matrices in the framework of conjugate product, and based on the real determinant the invertibility in the framework of conjugate product is investigated. These results imply that the proposed real representation has potential applications in the further investigation of conjugate product.

AB - A real representation of complex polynomial matrices in the framework of conjugate product is first proposed, and some interesting properties of the proposed real representation are given. With the real representations as tools, alternative proofs for some properties of conjugate product are given. In addition, the concept of real determinant is proposed for complex polynomial matrices in the framework of conjugate product, and based on the real determinant the invertibility in the framework of conjugate product is investigated. These results imply that the proposed real representation has potential applications in the further investigation of conjugate product.

KW - 11C08

KW - Real representation

KW - conjugate product

KW - invertible matrices

KW - polynomial matrices

KW - real determinant

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ER -

A real representation of complex polynomial matrices in the framework of conjugate product

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Keywords

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