Add to ORKGThe decomposition or approximation of a linear operator on a matrix space as a sum of Kronecker products plays an important role in matrix equations and low-rank modeling. The approximation problem in Frobenius norm admits a well-known solution via the singular value decomposition. However, the approximation problem in spectral norm, which is more natural for linear operators, is much more challenging. In particular, the Frobenius norm solution can be far from optimal in spectral norm. We describe an alternating optimization method based on semidefinite programming to obtain high-quality approximations in spectral norm, and we present computational experiments to illustrate the advantages of our approach.Comment: 17 pages, 4 figure
Computing spectra is a central problem in computational mathematics with an abundance of application...
AbstractInformation is obtained about best approximation of a matrix by positive semidefinite ones, ...
Exact eigenvalues, eigenvectors, and principal vectors of operators with infinite dimensional ranges...
In the existing methods for solving matrix completion, such as singular value thresholding (SVT), so...
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Matrix sparsification is a well-known approach in the design of efficient algorithms, where one appr...
AbstractThe spectral theory for unbounded normal operators is used to develop a systematic method of...
AbstractA new approximation tool such as sums of Kronecker products is recently found to provide a s...
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Abstract. The H ∞ norm of a transfer matrix function for a control system is the reciprocal of the l...
In problems involving the optimization of atomic norms, an upper bound on the dual atomic norm often...
We show that solving the frequency assignment problem is equivalent to solving a minimization proble...
Positive semidefinite matrices arise in a variety of fields, including statistics, signal processing...
In this article, new upper and lower bounds for the spectral condition number are obtained. These bo...
. A linear operator on a Hilbert space may be approximated with finite matrices by choosing an ortho...
Computing spectra is a central problem in computational mathematics with an abundance of application...
AbstractInformation is obtained about best approximation of a matrix by positive semidefinite ones, ...
Exact eigenvalues, eigenvectors, and principal vectors of operators with infinite dimensional ranges...
In the existing methods for solving matrix completion, such as singular value thresholding (SVT), so...
Abstract. A new identity is given in this paper for estimating the norm of the product of nonexpansi...
Matrix sparsification is a well-known approach in the design of efficient algorithms, where one appr...
AbstractThe spectral theory for unbounded normal operators is used to develop a systematic method of...
AbstractA new approximation tool such as sums of Kronecker products is recently found to provide a s...
Abstract in Undetermined In this paper theoretical results regarding a generalized minimum rank matr...
Abstract. The H ∞ norm of a transfer matrix function for a control system is the reciprocal of the l...
In problems involving the optimization of atomic norms, an upper bound on the dual atomic norm often...
We show that solving the frequency assignment problem is equivalent to solving a minimization proble...
Positive semidefinite matrices arise in a variety of fields, including statistics, signal processing...
In this article, new upper and lower bounds for the spectral condition number are obtained. These bo...
. A linear operator on a Hilbert space may be approximated with finite matrices by choosing an ortho...
Computing spectra is a central problem in computational mathematics with an abundance of application...
AbstractInformation is obtained about best approximation of a matrix by positive semidefinite ones, ...
Exact eigenvalues, eigenvectors, and principal vectors of operators with infinite dimensional ranges...