AbstractEstimating upper bounds of the spectrum of large Hermitian matrices has long been a problem with both theoretical and practical significance. Algorithms that can compute tight upper bounds with minimum computational cost will have applications in a variety of areas. We present a practical algorithm that exploits k-step Lanczos iteration with a safeguard step. The k is generally very small, say 5–8, regardless of the large dimension of the matrices. This makes the Lanczos iteration economical. The safeguard step can be realized with marginal cost by utilizing the theoretical bounds developed in this paper. The bounds establish the theoretical validity of a previous bound estimator that has been successfully used in various applicatio...
We compare the block-Lanczos and the Davidson methods for computing a basis of a singular subspace a...
The Lanczos algorithm is a well known technique for approximating a few eigenvalues and correspondin...
We analyze the Lanczos method for matrix function approximation (Lanczos-FA), an iterative algorithm...
AbstractEstimating upper bounds of the spectrum of large Hermitian matrices has long been a problem ...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian matrix. It...
Summary (translated from the Russian): "We present algorithms for the relatively fast, high-accuracy...
Computing eigenvalues from the interior of the spectrum of a large matrix is a difficult problem. Th...
Reliable estimates for the condition number of a large, sparse, real matrix A are important in many ...
Approximations of expressions of the form If:=trace(W^Tf(A)W), where A ∈R^{m×m} is a large symmetric...
AbstractIn the early seventies, Fried formulated bounds on the spectrum of assembled Hermitian posit...
AbstractComputing eigenvalues from the interior of the spectrum of a large matrix is a difficult pro...
The field of values and pseudospectra are useful tools for understanding the behaviour of various ma...
We develop probabilistic upper bounds for the matrix two-norm, the largest singular value. These bou...
We compare the block-Lanczos and the Davidson methods for computing a basis of a singular subspace a...
The Lanczos algorithm is a well known technique for approximating a few eigenvalues and correspondin...
We analyze the Lanczos method for matrix function approximation (Lanczos-FA), an iterative algorithm...
AbstractEstimating upper bounds of the spectrum of large Hermitian matrices has long been a problem ...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian matrix. It...
Summary (translated from the Russian): "We present algorithms for the relatively fast, high-accuracy...
Computing eigenvalues from the interior of the spectrum of a large matrix is a difficult problem. Th...
Reliable estimates for the condition number of a large, sparse, real matrix A are important in many ...
Approximations of expressions of the form If:=trace(W^Tf(A)W), where A ∈R^{m×m} is a large symmetric...
AbstractIn the early seventies, Fried formulated bounds on the spectrum of assembled Hermitian posit...
AbstractComputing eigenvalues from the interior of the spectrum of a large matrix is a difficult pro...
The field of values and pseudospectra are useful tools for understanding the behaviour of various ma...
We develop probabilistic upper bounds for the matrix two-norm, the largest singular value. These bou...
We compare the block-Lanczos and the Davidson methods for computing a basis of a singular subspace a...
The Lanczos algorithm is a well known technique for approximating a few eigenvalues and correspondin...
We analyze the Lanczos method for matrix function approximation (Lanczos-FA), an iterative algorithm...