Error Bounds for Linear Complementarity Problem of $SD{D_k}$ Matrices

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Abstract

$SD{D_k}$ matrices are a subclass of the nonsingular $H$-matrices. The infinity norm of the inverse for $SD{D_k}$ matrices has been given. In the paper, we utilize this result in the context of the linear complementarity problem, and the error bounds of the linear complementarity problem for $SD{D_k}$ matrices are obtained. By the relationship between the $SDD$ matrices and the $SD{D_k}$ matrices, we further obtain the error bounds of the linear complementarity problem for $SDD$ matrices. In addition, it is proved that the bounds presented in this paper are sharper than the well-known bounds under some conditions. Finally, numerical examples are provided to demonstrate the effectiveness of our results.

Keywords:

Linear complementarity problem error bound $SD{D_k}$ matrices $SDD$ matrices

Author Biographies

  • Kexin Zhang
    School of Mathematics and Information Science, Baoji University of Arts and Sciences, Baoji 721013, P.R. China
  • Min Hui
    School of Mathematics and Information Science, Baoji University of Arts and Sciences, Baoji 721013, P.R. China
  • Yaqiang Wang
    School of Mathematics and Information Science, Baoji University of Arts and Sciences, Baoji 721013, P.R. China
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DOI

10.4208/cmr.2025-0044

How to Cite

Error Bounds for Linear Complementarity Problem of $SD{D_k}$ Matrices. (2025). Communications in Mathematical Research, 41(4), 331-353. https://doi.org/10.4208/cmr.2025-0044