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Computing the generalized singular values/vectors of large sparse or structured matrix pairs (1996)

Zha, Hongyuan

Springer

Numerische Mathematik 72 (1996), S. 391-417

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ISSN: 0945-3245

Keywords: Mathematics Subject Classification (1991):65F15

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Summary. We present a numerical algorithm for computing a few extreme generalized singular values and corresponding vectors of a sparse or structured matrix pair $\{A,B\}$ . The algorithm is based on the CS decomposition and the Lanczos bidiagonalization process. At each iteration step of the Lanczos process, the solution to a linear least squares problem with $(A^{\rm T},B^{\rm T})^{\rm T}$ as the coefficient matrix is approximately computed, and this consists the only interface of the algorithm with the matrix pair $\{A,B\}$ . Numerical results are also given to demonstrate the feasibility and efficiency of the algorithm.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/s002110050175

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A note on constructing a symmetric matrix with specified diagonal entries and eigenvalues (1995)

Zha, Hongyuan ; Zhang, Zhenyue

Springer

BIT 35 (1995), S. 448-452

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ISSN: 1572-9125

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract A finite step algorithm is given such that for any two vectorsa, λ ∈R n witha majorized by λ, it computes a symmetric matrixH ∈R n x n with the elements ofa and λ as its diagonal entries and eigenvalues, respectively.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01732616

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An algorithm and a stability theory for downdating the ULV decomposition (1996)

Barlow, Jesse L. ; Yoon, Peter A. ; Zha, Hongyuan

Springer

BIT 36 (1996), S. 14-40

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ISSN: 1572-9125

Keywords: Orthogonal decomposition ; downdating ; error analysis ; subspaces

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract An alternative to performing the singular value decomposition is to factor a matrixA into $$A = U\left( {\begin{array}{*{20}c} C \\ 0 \\ \end{array} } \right)V^T $$ , whereU andV are orthogonal matrices andC is a lower triangular matrix which indicates a separation between two subspaces by the size of its columns. These subspaces are denoted byV = (V 1,V 2), where the columns ofC are partitioned conformally intoC = (C 1,C 2) with ‖C 2 ‖ F ≤ ε. Here ε is some tolerance. In recent years, this has been called the ULV decomposition (ULVD). If the matrixA results from statistical observations, it is often desired to remove old observations, thus deleting a row fromA and its ULVD. In matrix terms, this is called a downdate. A downdating algorithm is proposed that preserves the structure in the downdated matrix $$\bar C$$ to the extent possible. Strong stability results are proven for these algorithms based upon a new perturbation theory.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01740542

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