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A combination of Givens and hyperbolic plane rotations is used to update the Cholesky-type factorization of the input quasiseparable matrix by
determining a factorization of its shifted version of the form $LDL^T$, where $L$ is lower triangular and $D$ is a signature matrix.
If the shifted matrix is also definite then the Cholesky factorization of the shifted matrix is computed in a stable way by using orthogonal transformations. Since quasiseparability is maintained under diagonal shifting, a fast variant of the updating procedure using
computations with generators is also devised. Numerical experiments show the effectiveness and robustness of the proposed algorithm.
From: Luca Gemignani [view email]
[v1]
Thu, 25 Jun 2026 12:26:28 UTC (411 KB)
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