The Leslie Matrix Solution of the Reduced Biquaternion Matrix Equation AXB+CXD=E

doi:10.1007/s42967-024-00452-4

Communications on Applied Mathematics and Computation ›› 2026, Vol. 8 ›› Issue (2): 533-546.doi: 10.1007/s42967-024-00452-4

The Leslie Matrix Solution of the Reduced Biquaternion Matrix Equation AXB+CXD=E

Jiaxin Lan¹, Jingpin Huang², Dan Huang³

1. School of Humanities and Education, Guangxi Financial Vocational College, Nanning, 530007, Guangxi, China;
2. College of Mathematics and Physics, Guangxi Minzu University, Nanning, 530006, Guangxi, China;
3. School of Computer Science and Engineering, Yulin Normal University, Yulin, 537000, Guangxi, China

收稿日期:2024-03-09 修回日期:2024-08-01 出版日期:2026-04-07 发布日期:2026-04-07
通讯作者: Jiaxin Lan,E-mail:xinjlan@qq.com E-mail:xinjlan@qq.com
基金资助:
This work was supported by the 2024 School-Level Project of Guangxi Financial Vocational College (No. 607001), the National Natural Science Foundation of China (No. 12361078), the Sichuan Science and Technology Program (No. 2024NSFSC0721), the Postdoctoral Fellowship Program of CPSF (No. GZB20230092), and the China Postdoctoral Science Foundation (No. 2023M740383).

The Leslie Matrix Solution of the Reduced Biquaternion Matrix Equation AXB+CXD=E

Jiaxin Lan¹, Jingpin Huang², Dan Huang³

1. School of Humanities and Education, Guangxi Financial Vocational College, Nanning, 530007, Guangxi, China;
2. College of Mathematics and Physics, Guangxi Minzu University, Nanning, 530006, Guangxi, China;
3. School of Computer Science and Engineering, Yulin Normal University, Yulin, 537000, Guangxi, China

Received:2024-03-09 Revised:2024-08-01 Online:2026-04-07 Published:2026-04-07
Contact: Jiaxin Lan,E-mail:xinjlan@qq.com E-mail:xinjlan@qq.com
Supported by:
This work was supported by the 2024 School-Level Project of Guangxi Financial Vocational College (No. 607001), the National Natural Science Foundation of China (No. 12361078), the Sichuan Science and Technology Program (No. 2024NSFSC0721), the Postdoctoral Fellowship Program of CPSF (No. GZB20230092), and the China Postdoctoral Science Foundation (No. 2023M740383).

摘要/Abstract

摘要： This paper investigates two different Leslie matrix solutions for the reduced biquaternion matrix equation \begin{document}$ AXB+CXD=E $\end{document}. Through the permutation matrices, the complex decomposition of reduced biquaternion matrices, and the Kronecker product, by leveraging the specific attributes of Leslie matrices, we transform the constrained reduced biquaternion matrix equation into an unconstrained form. Consequently, we derive the necessary and sufficient conditions for the existence of solutions in the form of Leslie matrices to the reduced biquaternion matrix equation \begin{document}$ AXB+CXD=E $\end{document} and provide a general expression for such solutions. Finally, numerical examples are presented to demonstrate the effectiveness of the proposed algorithm.

关键词: Reduced biquaternion, Leslie matrix, Kronecker product, Complex decomposition, Optimal approximation

Abstract: This paper investigates two different Leslie matrix solutions for the reduced biquaternion matrix equation \begin{document}$ AXB+CXD=E $\end{document}. Through the permutation matrices, the complex decomposition of reduced biquaternion matrices, and the Kronecker product, by leveraging the specific attributes of Leslie matrices, we transform the constrained reduced biquaternion matrix equation into an unconstrained form. Consequently, we derive the necessary and sufficient conditions for the existence of solutions in the form of Leslie matrices to the reduced biquaternion matrix equation \begin{document}$ AXB+CXD=E $\end{document} and provide a general expression for such solutions. Finally, numerical examples are presented to demonstrate the effectiveness of the proposed algorithm.

Key words: Reduced biquaternion, Leslie matrix, Kronecker product, Complex decomposition, Optimal approximation

中图分类号:

Jiaxin Lan, Jingpin Huang, Dan Huang. The Leslie Matrix Solution of the Reduced Biquaternion Matrix Equation AXB+CXD=E[J]. Communications on Applied Mathematics and Computation, 2026, 8(2): 533-546.

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The Leslie Matrix Solution of the Reduced Biquaternion Matrix Equation AXB+CXD=E

The Leslie Matrix Solution of the Reduced Biquaternion Matrix Equation AXB+CXD=E

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