On non strictly diagonally dominant pentadiagonal matrices

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DOI:

https://doi.org/10.35819/remat2024v10i2id7012

Keywords:

Crout's method, pentadiagonal matrix, non strictly diagonally dominant matrices

Abstract

Based on Crout's method, we will present, in this work, new non singularity criteria and sufficient conditions for existence of the LU factorization, for non strictly diagonally dominant pentadiagonal matrices. Crout's method is a recursive process of n stages that obtains the factorization A = LU of a pentadiagonal matrix of order n. In this recursive process of obtaining both the lower triangular matrix L and the upper triangular matrix U, the parameters alpha_i, 1 <= i <= n, must be non-zero to ensure that det(A) neq 0 and A = LU. Crout's recursive method is replaced by the analysis of sufficient conditions that can be verified simultaneously with low computational cost.

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References

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Published

2024-10-25

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Section

Mathematics

How to Cite

On non strictly diagonally dominant pentadiagonal matrices. REMAT: Revista Eletrônica da Matemática, Bento Gonçalves, RS, v. 10, n. 2, p. e3007, 2024. DOI: 10.35819/remat2024v10i2id7012. Disponível em: https://periodicos.ifrs.edu.br/index.php/REMAT/article/view/7012.. Acesso em: 1 nov. 2024.

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