We discuss the use of a matrix-oriented approach for numerically solving the dense matrix equation AX + XAT + M1XN1 + … + MℓXNℓ = F, with ℓ ≥ 1, and Mi, Ni, i = 1, …, ℓ of low rank. The approach relies on the Sherman–Morrison–Woodbury formula formally defined in the vectorized form of the problem, but applied in the matrix setting. This allows one to solve medium size dense problems with computational costs and memory requirements dramatically lower than with a Kronecker formulation. Application problems leading to medium size equations of this form are illustrated and the performance of the matrix-oriented method is reported. The application of the procedure as the core step in the solution of the large-scale problem is also shown. In addi...
AbstractLinear systems with structures such as Toeplitz, Vandermonde or Cauchy-likeness can be solve...
AbstractIn the present paper, we propose the global full orthogonalization method (Gl-FOM) and globa...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...
We discuss the use of a matrix-oriented approach for numerically solving the dense matrix equation A...
AbstractWe propose a new direct method to solve linear systems. This method is based on the Sherman–...
We consider the solution of systems of linear matrix equations in two or three unknown matrices. For...
Given the square matrices A, B, D, E and the matrix C of conforming dimensions, we consider the line...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...
We propose a new dense method for determining the numerical solution to a class of third order tenso...
This work is concerned with the numerical solution of large-scale linear matrix equations A1XB1T++AK...
We address the important field of large scale matrix based algorithms in control and model order red...
Abstract. On many high-speed computers the dense matrix technique is preferable to sparse matrix tec...
AbstractWe consider systems of equations of the form AATx = b, where A is a sparse matrix having a s...
AbstractWe discuss a new method for the iterative computation of some of the generalized singular va...
AbstractA fast numerical algorithm for solving systems of linear equations with tridiagonal block To...
AbstractLinear systems with structures such as Toeplitz, Vandermonde or Cauchy-likeness can be solve...
AbstractIn the present paper, we propose the global full orthogonalization method (Gl-FOM) and globa...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...
We discuss the use of a matrix-oriented approach for numerically solving the dense matrix equation A...
AbstractWe propose a new direct method to solve linear systems. This method is based on the Sherman–...
We consider the solution of systems of linear matrix equations in two or three unknown matrices. For...
Given the square matrices A, B, D, E and the matrix C of conforming dimensions, we consider the line...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...
We propose a new dense method for determining the numerical solution to a class of third order tenso...
This work is concerned with the numerical solution of large-scale linear matrix equations A1XB1T++AK...
We address the important field of large scale matrix based algorithms in control and model order red...
Abstract. On many high-speed computers the dense matrix technique is preferable to sparse matrix tec...
AbstractWe consider systems of equations of the form AATx = b, where A is a sparse matrix having a s...
AbstractWe discuss a new method for the iterative computation of some of the generalized singular va...
AbstractA fast numerical algorithm for solving systems of linear equations with tridiagonal block To...
AbstractLinear systems with structures such as Toeplitz, Vandermonde or Cauchy-likeness can be solve...
AbstractIn the present paper, we propose the global full orthogonalization method (Gl-FOM) and globa...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...