We discuss a new method for the iterative computation of some of the generalized singular values and vectors of a large sparse matrix. Our starting point is the augmented matrix formulation of the GSVD. The subspace expansion is performed by (approximately) solving a Jacobi–Davidson type correction equation, while we give several alternatives for the subspace extraction. Numerical experiments illustrate the performance of the method
The higher-order generalized singular value decomposition (HO-GSVD) is a matrix factorization techni...
The higher-order generalized singular value decomposition (HO-GSVD) is a matrix factorization techni...
The generalized singular value decomposition (GSVD) of a pair of matrices expresses each matrix as a...
We discuss a new method for the iterative computation of some of the generalized singular values and...
AbstractWe discuss a new method for the iterative computation of some of the generalized singular va...
Two harmonic extraction based Jacobi--Davidson (JD) type algorithms are proposed to compute a partia...
We discuss a new method for the iterative computation of a portion of the singular values and vector...
We discuss a new method for the iterative computation of a portion of the singular values and vector...
We study a homogeneous variant of the Jacobi-Davidson method for the generalized and polynomial eige...
AbstractWe propose a Jacobi–Davidson type method to compute selected eigenpairs of the product eigen...
The generalized singular value decomposition (GSVD) of a pair of matrices is the natural tool for ce...
Abstract. This paper is the result of contrived efforts to break the barrier between numerical accur...
. We discuss approaches for an efficient handling of the correction equation in the Jacobi-Davidson ...
Abstract. We discuss approaches for an efficient handling of the correction equation in the Jacobi-D...
We discuss a new method for the iterative computation of a portion of the spectrum of a large sparse...
The higher-order generalized singular value decomposition (HO-GSVD) is a matrix factorization techni...
The higher-order generalized singular value decomposition (HO-GSVD) is a matrix factorization techni...
The generalized singular value decomposition (GSVD) of a pair of matrices expresses each matrix as a...
We discuss a new method for the iterative computation of some of the generalized singular values and...
AbstractWe discuss a new method for the iterative computation of some of the generalized singular va...
Two harmonic extraction based Jacobi--Davidson (JD) type algorithms are proposed to compute a partia...
We discuss a new method for the iterative computation of a portion of the singular values and vector...
We discuss a new method for the iterative computation of a portion of the singular values and vector...
We study a homogeneous variant of the Jacobi-Davidson method for the generalized and polynomial eige...
AbstractWe propose a Jacobi–Davidson type method to compute selected eigenpairs of the product eigen...
The generalized singular value decomposition (GSVD) of a pair of matrices is the natural tool for ce...
Abstract. This paper is the result of contrived efforts to break the barrier between numerical accur...
. We discuss approaches for an efficient handling of the correction equation in the Jacobi-Davidson ...
Abstract. We discuss approaches for an efficient handling of the correction equation in the Jacobi-D...
We discuss a new method for the iterative computation of a portion of the spectrum of a large sparse...
The higher-order generalized singular value decomposition (HO-GSVD) is a matrix factorization techni...
The higher-order generalized singular value decomposition (HO-GSVD) is a matrix factorization techni...
The generalized singular value decomposition (GSVD) of a pair of matrices expresses each matrix as a...