Algebra of L-Banded Matrices

Shunqi Huang; Lei Liu; Brian M. Kurkoski

doi:10.1109/ACCESS.2023.3244780

IEEE Access (Jan 2023)

Algebra of L-Banded Matrices

Shunqi Huang,
Lei Liu,
Brian M. Kurkoski

Affiliations

Shunqi Huang: ORCiD; School of Information Science, Japan Advanced Institute of Science and Technology, Nomi, Japan
Lei Liu: ORCiD; Zhejiang Provincial Key Laboratory of Information Processing, Communication and Networking, College of Information Science and Electronic Engineering, Zhejiang University, Hangzhou, China
Brian M. Kurkoski: ORCiD; School of Information Science, Japan Advanced Institute of Science and Technology, Nomi, Japan

DOI: https://doi.org/10.1109/ACCESS.2023.3244780
Journal volume & issue: Vol. 11
pp. 17658 – 17664

Abstract

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Convergence is a crucial issue in iterative algorithms. Damping is commonly employed to ensure the convergence of iterative algorithms. The conventional ways of damping are scalar-wise, and either heuristic or empirical. Recently, an analytically optimized vector damping was proposed for memory message-passing (iterative) algorithms. As a result, it yields a special class of covariance matrices called L-banded matrices. In this paper, we show these matrices have broad algebraic properties arising from their L-banded structure. In particular, compact analytic expressions for the LDL decomposition, the Cholesky decomposition, the determinant after a column substitution, minors, and cofactors are derived. Furthermore, necessary and sufficient conditions for an L-banded matrix to be definite, a recurrence to obtain the characteristic polynomial, and some other properties are given.

Published in IEEE Access

ISSN: 2169-3536 (Online)
Publisher: IEEE
Country of publisher: United States
LCC subjects: Technology: Electrical engineering. Electronics. Nuclear engineering
Website: https://ieeexplore.ieee.org/xpl/RecentIssue.jsp?punumber=6287639

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