Equality conditions for lower bounds on the smallest singular value of a bidiagonal matrix |
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| Authors: | Yusaku Yamamoto |
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| Institution: | aNagoya University, Department of Computational Science and Engineering, Nagoya, Aichi 464-8603, Japan |
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| Abstract: | Several lower bounds have been proposed for the smallest singular value of a square matrix, such as Johnson’s bound, Brauer-type bound, Li’s bound and Ostrowski-type bound. In this paper, we focus on a bidiagonal matrix and investigate the equality conditions for these bounds. We show that the former three bounds give strict lower bounds if all the bidiagonal elements are non-zero. For the Ostrowski-type bound, we present an easily verifiable necessary and sufficient condition for the equality to hold. |
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| Keywords: | Singular values Lower bounds Equality conditions Bidiagonal matrix dqds Algorithm |
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