A fast algorithm for solving diagonally dominant symmetric quasi-pentadiagonal Toeplitz linear systems

Abstract: In this paper, we develop a new algorithm for solving diagonally dominant symmetric quasi-pentadiagonal Toeplitz linear systems. Numerical experiments are given in order to illustrate the validity and efficiency of our algorithm.

“…Recent research continues to highlight the importance of studying Topelitz matrices, such as [3,12,13,19].…”

“…However, the authors did not present sufficient conditions for existence of the LU factorization of Toeplitz tridiagonal matrices. In 2021, Skander Belhaj et al [3] also developed in their paper a fast algorithm for solving diagonally dominant symmetric quasi-pentadiagonal Toeplitz linear systems. Numerical experiments were given in order to illustrate the validity and efciency of the algorithm.…”

Sufficient Conditions for Existence of the LU Factorization of Toeplitz Symmetric Tridiagonal Matrices

“…Recent research continues to highlight the importance of studying Topelitz matrices, such as [3,12,13,19].…”

“…However, the authors did not present sufficient conditions for existence of the LU factorization of Toeplitz tridiagonal matrices. In 2021, Skander Belhaj et al [3] also developed in their paper a fast algorithm for solving diagonally dominant symmetric quasi-pentadiagonal Toeplitz linear systems. Numerical experiments were given in order to illustrate the validity and efciency of the algorithm.…”

Sufficient Conditions for Existence of the LU Factorization of Toeplitz Symmetric Tridiagonal Matrices

“…Later on this method was generalised to solve the block quasi tridiagonal Toeplitz [4]. In [5,6], a fast method for solving quasi-pentadiagonal Toeplitz linear systems was presented, which was based on solving pentadiagonal Toeplitz linear systems.…”

New algorithm for solving pentadiagonal CUPL-Toeplitz linear systems