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Abstract
The cyclic reduction method is a direct method for solving tridiagonal linear systems. At the first step of this method, a tridiagonal coefficient matrix is transformed into a pentadiagonal form. In this article, we prove that the condition number for eigenvalues of some classes of coefficient matrices always decreases after the first step of the cyclic reduction method.
Acknowledgements
This study is partially supported by Grant for Scientific Research No.19656025 of Japan Society for the Promotion of Science.