The FEAST method for solving large sparse eigenproblems is equivalent to subspace iteration with an approximate spectral projector and implicit orthogonalization. This relation allows us to characterize the convergence of this method in terms of the error of a certain rational approximant to an indicator function. We propose improved rational approximants leading to FEAST variants with faster convergence, in particular, when using rational approximants based on the work of Zolotarev. Numerical experiments demonstrate the possible computational savings especially for pencils whose eigenvalues are not well separated and when the dimension of the search space is only slightly larger than the number of wanted eigenvalues. The new approach impro...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
Some applications in quantum physics require the computation of a relatively large part of the inte...
Most iterative algorithms for eigenpair computation consist of two main steps: a subspace update (SU...
The FEAST method for solving large sparse eigenproblems is equivalent to subspace iteration with an ...
The FEAST method for solving large sparse eigenproblems is equivalent to subspace iteration with an ...
We analyze the FEAST method for computing selected eigenvalues and eigenvectors of large sparse matr...
Subspace iteration algorithms accelerated by rational filtering, such as FEAST, have rece...
The FEAST eigensolver is extended to the computation of the singular triplets of a large matrix $A$ ...
In recent years, contour-based eigensolvers have emerged as a standard approach for the solution of ...
A filtered subspace iteration for computing a cluster of eigenvalues and its accompanying eigenspace...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
We analyze the stability of a class of eigensolvers that target interior eigenvalues with rational f...
The matrix eigenvalue problem is often encountered in scientific computing applications. Although it...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental m...
We develop algorithms that construct robust (i.e., reliable for a given tolerance, and scaling indep...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
Some applications in quantum physics require the computation of a relatively large part of the inte...
Most iterative algorithms for eigenpair computation consist of two main steps: a subspace update (SU...
The FEAST method for solving large sparse eigenproblems is equivalent to subspace iteration with an ...
The FEAST method for solving large sparse eigenproblems is equivalent to subspace iteration with an ...
We analyze the FEAST method for computing selected eigenvalues and eigenvectors of large sparse matr...
Subspace iteration algorithms accelerated by rational filtering, such as FEAST, have rece...
The FEAST eigensolver is extended to the computation of the singular triplets of a large matrix $A$ ...
In recent years, contour-based eigensolvers have emerged as a standard approach for the solution of ...
A filtered subspace iteration for computing a cluster of eigenvalues and its accompanying eigenspace...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
We analyze the stability of a class of eigensolvers that target interior eigenvalues with rational f...
The matrix eigenvalue problem is often encountered in scientific computing applications. Although it...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental m...
We develop algorithms that construct robust (i.e., reliable for a given tolerance, and scaling indep...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
Some applications in quantum physics require the computation of a relatively large part of the inte...
Most iterative algorithms for eigenpair computation consist of two main steps: a subspace update (SU...