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Applied Mathematics and Mechanics (English Edition) ›› 2009, Vol. 30 ›› Issue (2): 247-253 .

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An inversion algorithm for general tridiagonal matrix

冉瑞生,黄廷祝,刘兴平

  • 谷同祥
    •   

      1. Department of Automation, CISDI Engineering Co.,Ltd., Chongqing 400013, P. R. China;
      2. School of Applied Mathematics, University of Electronic Science and Technology of China,Chengdu 610054, P. R. China;
      3. Laboratory of Computational Physics, Institute of Applied Physics and Computational Mathematics, Beijing 100088, P. R.China
    • 收稿日期:2008-05-12 修回日期:2008-11-27 出版日期:2009-02-11 发布日期:2009-02-11
    • 通讯作者: 冉瑞生

    An inversion algorithm for general tridiagonal matrix

    Rui-sheng RAN,Ting-zhu HUANG,Xing-ping LIU,Tong-xiang GU   

      1. Department of Automation, CISDI Engineering Co.,Ltd., Chongqing 400013, P. R. China;
      2. School of Applied Mathematics, University of Electronic Science and Technology of China,Chengdu 610054, P. R. China;
      3. Laboratory of Computational Physics, Institute of Applied Physics and Computational Mathematics, Beijing 100088, P. R.China
    • Received:2008-05-12 Revised:2008-11-27 Online:2009-02-11 Published:2009-02-11
    • Contact: Rui-sheng RAN

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    摘要: An algorithm for the inverse of a general tridiagonal matrix is presented. For a tridiagonal matrix having the Doolittle factorization, an inversion algorithm is established. The algorithm is then generalized to deal with a general tridiagonal matrix without any restriction. Comparison with other methods is provided, indicating low computational complexity of the proposed algorithm, and its applicability to general tridiagonal matrices.

    Abstract: An algorithm for the inverse of a general tridiagonal matrix is presented. For a tridiagonal matrix having the Doolittle factorization, an inversion algorithm is established. The algorithm is then generalized to deal with a general tridiagonal matrix without any restriction. Comparison with other methods is provided, indicating low computational complexity of the proposed algorithm, and its applicability to general tridiagonal matrices.

    Key words: tridiagonal matrix, inverse, Doolittle factorization

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