[[abstract]]Several Jacobi-Davidson type methods are proposed for computing interior eigenpairs of large-scale cubic eigenvalue problems. To successively compute the eigenpairs, a novel explicit non-equivalence deflation method with low-rank updates is developed and analysed. Various techniques such as locking, search direction transformation, restarting, and preconditioning are incorporated into the methods to improve stability and efficiency. A semiconductor quantum dot model is given as an example to illustrate the cubic nature of the eigenvalue system resulting from the finite difference approximation. Numerical results of this model are given to demonstrate the convergence and effectiveness of the methods. Comparison results are also p...
. We discuss approaches for an efficient handling of the correction equation in the Jacobi-Davidson ...
We present a new numerical method for computing selected eigenvalues and eigenvectors of the two-par...
We study a homogeneous variant of the Jacobi-Davidson method for the generalized and polynomial eige...
Several Jacobi–Davidson type methods are proposed for computing interior eigenpairs of large-scale c...
[[abstract]]In this paper, we study how to use the polynomial Jacobi-Davidson iterative mehtod to so...
Abstract. We discuss variants of the Jacobi–Davidson method for solving the generalized complex-symm...
We propose a Jacobi–Davidson type method to compute selected eigenpairs of the product eigenvalue pr...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
We discuss variants of the Jacobi–Davidson method for solving the generalized complex-symmetric eige...
We propose Jacobi-Davidson type methods for polynomial two-parameter eigenvalue problems (PMEP). Suc...
textabstractThe Jacobi-Davidson method is suitable for computing solutions of large $n$-dimensional ...
. We discuss a new method for the iterative computation of a portion of the spectrum of a large spar...
We present a comparative study of the application of modern eigenvalue algorithms to an eigenvalue p...
Abstract. We investigate the efficient computation of a few of the lowest eigenvalues of a symmetric...
. We discuss approaches for an efficient handling of the correction equation in the Jacobi-Davidson ...
We present a new numerical method for computing selected eigenvalues and eigenvectors of the two-par...
We study a homogeneous variant of the Jacobi-Davidson method for the generalized and polynomial eige...
Several Jacobi–Davidson type methods are proposed for computing interior eigenpairs of large-scale c...
[[abstract]]In this paper, we study how to use the polynomial Jacobi-Davidson iterative mehtod to so...
Abstract. We discuss variants of the Jacobi–Davidson method for solving the generalized complex-symm...
We propose a Jacobi–Davidson type method to compute selected eigenpairs of the product eigenvalue pr...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
We discuss variants of the Jacobi–Davidson method for solving the generalized complex-symmetric eige...
We propose Jacobi-Davidson type methods for polynomial two-parameter eigenvalue problems (PMEP). Suc...
textabstractThe Jacobi-Davidson method is suitable for computing solutions of large $n$-dimensional ...
. We discuss a new method for the iterative computation of a portion of the spectrum of a large spar...
We present a comparative study of the application of modern eigenvalue algorithms to an eigenvalue p...
Abstract. We investigate the efficient computation of a few of the lowest eigenvalues of a symmetric...
. We discuss approaches for an efficient handling of the correction equation in the Jacobi-Davidson ...
We present a new numerical method for computing selected eigenvalues and eigenvectors of the two-par...
We study a homogeneous variant of the Jacobi-Davidson method for the generalized and polynomial eige...