In this work, we propose a novel parallel-in-time preconditioner for an all-at-once system, arising from the numerical solution of linear wave equations. Namely, our main result concerns a block tridiagonal Toeplitz preconditioner that can be diagonalized via fast sine transforms, whose effectiveness is theoretically shown for the nonsymmetric block Toeplitz system resulting from discretizing the concerned wave equation. Our approach is to first transform the original linear system into a symmetric one and subsequently develop the desired preconditioning strategy based on the spectral symbol of the modified matrix. Various Krylov subspace methods are considered. That is, we show that the minimal polynomial of the preconditioned matrix is of...
Abstract. Circulant preconditioning for symmetric Toeplitz linear systems is well-established; theor...
Circulant matrices can be effective preconditioners for linear systems of equations with a Toeplitz ...
Circulant preconditioning for symmetric Toeplitz linear systems is well established; theoretical gua...
In this work, we propose a novel parallel-in-time preconditioner for an all-at-once system, arising ...
In this work, we propose a simple yet generic preconditioned Krylov subspace method for a large clas...
In this work, we propose a simple yet generic preconditioned Krylov subspace method for a large clas...
This thesis concerns preconditioning for Toeplitz-related systems. Specifically, we consider functio...
In this work, we propose a novel preconditioned Krylov subspace method for solving an optimal contro...
AbstractAcceleration techniques for iterative methods for linear systems of both static (Qy = b) and...
AbstractFast iterative Toeplitz solvers based on the preconditioned conjugate gradient (PCG) methods...
Circulant preconditioners are commonly used to accelerate the rate of convergence of iterative metho...
Circulant preconditioning for symmetric Toeplitz linear systems is well-established; theoretical gua...
The iterative solution of a block Toeplitz linear system by the conjugate gradient method is analyze...
For symmetric systems, rigorous convergence bounds can be obtained which depend only on the eigenval...
A great deal of real-world applications requires the solution of a Partial Differential Equation (P...
Abstract. Circulant preconditioning for symmetric Toeplitz linear systems is well-established; theor...
Circulant matrices can be effective preconditioners for linear systems of equations with a Toeplitz ...
Circulant preconditioning for symmetric Toeplitz linear systems is well established; theoretical gua...
In this work, we propose a novel parallel-in-time preconditioner for an all-at-once system, arising ...
In this work, we propose a simple yet generic preconditioned Krylov subspace method for a large clas...
In this work, we propose a simple yet generic preconditioned Krylov subspace method for a large clas...
This thesis concerns preconditioning for Toeplitz-related systems. Specifically, we consider functio...
In this work, we propose a novel preconditioned Krylov subspace method for solving an optimal contro...
AbstractAcceleration techniques for iterative methods for linear systems of both static (Qy = b) and...
AbstractFast iterative Toeplitz solvers based on the preconditioned conjugate gradient (PCG) methods...
Circulant preconditioners are commonly used to accelerate the rate of convergence of iterative metho...
Circulant preconditioning for symmetric Toeplitz linear systems is well-established; theoretical gua...
The iterative solution of a block Toeplitz linear system by the conjugate gradient method is analyze...
For symmetric systems, rigorous convergence bounds can be obtained which depend only on the eigenval...
A great deal of real-world applications requires the solution of a Partial Differential Equation (P...
Abstract. Circulant preconditioning for symmetric Toeplitz linear systems is well-established; theor...
Circulant matrices can be effective preconditioners for linear systems of equations with a Toeplitz ...
Circulant preconditioning for symmetric Toeplitz linear systems is well established; theoretical gua...