The numerical solution of eigenvalue problems is essential in various application areas of scientific and engineering domains. In many problem classes, the practical interest is only a small subset of eigenvalues so it is unnecessary to compute all of the eigenvalues. Notable examples are the electronic structure problems where the $k$-th smallest eigenvalue is closely related to the electronic properties of materials. In this paper, we consider the $k$-th eigenvalue problems of symmetric dense matrices with low-rank off-diagonal blocks. We present a linear time generalized LDL decomposition of $\mathcal{H}^2$ matrices and combine it with the bisection eigenvalue algorithm to compute the $k$-th eigenvalue with controllable accuracy. In addi...
AbstractWe propose a simple method for validated computation of eigenvalues of symmetric matrices. T...
Abstract Eigenvalue problems arise in many application areas ranging from compu-tational fluid dynam...
This report discusses a serial implementation of Cuppen's divide and conquer algorithm for comp...
The computation of eigenvalues of large-scale matrices arising from finite element discretizations h...
This thesis is on the numerical computation of eigenvalues of symmetric hierarchical matrices. The n...
The computation of eigenvalues of large-scale matrices arising from finite ele-ment discretizations ...
Obtaining the eigenvalues and eigenvectors of large matrices is a key problem in electronic structur...
textThis thesis demonstrates an efficient parallel method of solving the generalized eigenvalue prob...
Obtaining the eigenvalues and eigenvectors of large matrices is a key problem in electronic structur...
Abstract. Bisection is a parallelizable method for finding the eigenvalues of real symmetric tridiag...
An algorithm is proposed for a relatively fast and highly accurate calculation of several eigenvalue...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
We present a greedy algorithm for computing selected eigenpairs of a large sparse matrix $H$ that ca...
Complex symmetric matrices often appear in quantum physics in the solution methods of partial differ...
This report demonstrates parallel versions of the Eispack functions TRED2 and TQL2 for finding all...
AbstractWe propose a simple method for validated computation of eigenvalues of symmetric matrices. T...
Abstract Eigenvalue problems arise in many application areas ranging from compu-tational fluid dynam...
This report discusses a serial implementation of Cuppen's divide and conquer algorithm for comp...
The computation of eigenvalues of large-scale matrices arising from finite element discretizations h...
This thesis is on the numerical computation of eigenvalues of symmetric hierarchical matrices. The n...
The computation of eigenvalues of large-scale matrices arising from finite ele-ment discretizations ...
Obtaining the eigenvalues and eigenvectors of large matrices is a key problem in electronic structur...
textThis thesis demonstrates an efficient parallel method of solving the generalized eigenvalue prob...
Obtaining the eigenvalues and eigenvectors of large matrices is a key problem in electronic structur...
Abstract. Bisection is a parallelizable method for finding the eigenvalues of real symmetric tridiag...
An algorithm is proposed for a relatively fast and highly accurate calculation of several eigenvalue...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
We present a greedy algorithm for computing selected eigenpairs of a large sparse matrix $H$ that ca...
Complex symmetric matrices often appear in quantum physics in the solution methods of partial differ...
This report demonstrates parallel versions of the Eispack functions TRED2 and TQL2 for finding all...
AbstractWe propose a simple method for validated computation of eigenvalues of symmetric matrices. T...
Abstract Eigenvalue problems arise in many application areas ranging from compu-tational fluid dynam...
This report discusses a serial implementation of Cuppen's divide and conquer algorithm for comp...