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The Numerically Stable Reconstruction of a Jacobi Matrix from Spectral Data

A stable algorithm is given for the construction of a symmetric tridiagonal matrix of order n from its eigenvalues and the eigenvalues of its upper left principal submatrix of order n - 1. The algorithm might be of help in the approximate solution of inverse eigenvalue problems for Sturm-Liouville equations. (Author).

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  • "A stable algorithm is given for the construction of a symmetric tridiagonal matrix of order n from its eigenvalues and the eigenvalues of its upper left principal submatrix of order n - 1. The algorithm might be of help in the approximate solution of inverse eigenvalue problems for Sturm-Liouville equations. (Author)."@en

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  • "The Numerically Stable Reconstruction of a Jacobi Matrix from Spectral Data"@en
  • "The numerically stable reconstruction of a Jacobi matrix from spectral data"
  • "The numerically stable reconstruction of a Jacobi matrix from spectral data"@en
  • "The Numerically Stable Reconstruction of a Jacobi : Matrix From Spectral Data"
  • "The Numerically Stable Reconstruction of a Jacobi : Matrix from Spectral Data"