In this work, we propose a novel preconditioned Krylov subspace method for solving an optimal control problem of wave equations, after explicitly identifying the asymptotic spectral distribution of the involved sequence of linear coefficient matrices from the optimal control problem. Namely, we first show that the all-at-once system stemming from the wave control problem is associated to a structured coefficient matrix-sequence possessing an eigenvalue distribution. Then, based on such a spectral distribution of which the symbol is explicitly identified, we develop an ideal preconditioner and two parallel-in-time preconditioners for the saddle point system composed of two block Toeplitz matrices. For the ideal preconditioner, we show that t...
Dropping some of the elements in the Jacobian matrix A produces a significant reduction of the fill-...
AbstractThis paper deals with the convergence analysis of various preconditioned iterations to compu...
We investigate the cost of preconditioning when solving large sparse saddlepoint linear systems wit...
In this work, we propose a novel preconditioned Krylov subspace method for solving an optimal contro...
In this work, we propose a novel parallel-in-time preconditioner for an all-at-once system, arising ...
Optimal flow control problems are important for applications in science and engineering. Solving suc...
In this work, we propose a simple yet generic preconditioned Krylov subspace method for a large clas...
In this paper we present some aspects of recent works we have been developping on preconditioning te...
In this work, we propose a simple yet generic preconditioned Krylov subspace method for a large clas...
The final purpose of any scientific discipline can be regarded as the solution of real-world problem...
By considering Krylov subspace methods in nonstandard inner products, we develop in this thesis new ...
AbstractMany researchers have considered preconditioners, applied to linear systems, whose matrix co...
We introduce a spectral preconditioner for control problems associated with first-order temporary ev...
In this manuscript, we study preconditioning techniques for optimal in-domain control of the Navier-...
In this manuscript, we study preconditioning techniques for optimal in-domain control of the Navier-...
Dropping some of the elements in the Jacobian matrix A produces a significant reduction of the fill-...
AbstractThis paper deals with the convergence analysis of various preconditioned iterations to compu...
We investigate the cost of preconditioning when solving large sparse saddlepoint linear systems wit...
In this work, we propose a novel preconditioned Krylov subspace method for solving an optimal contro...
In this work, we propose a novel parallel-in-time preconditioner for an all-at-once system, arising ...
Optimal flow control problems are important for applications in science and engineering. Solving suc...
In this work, we propose a simple yet generic preconditioned Krylov subspace method for a large clas...
In this paper we present some aspects of recent works we have been developping on preconditioning te...
In this work, we propose a simple yet generic preconditioned Krylov subspace method for a large clas...
The final purpose of any scientific discipline can be regarded as the solution of real-world problem...
By considering Krylov subspace methods in nonstandard inner products, we develop in this thesis new ...
AbstractMany researchers have considered preconditioners, applied to linear systems, whose matrix co...
We introduce a spectral preconditioner for control problems associated with first-order temporary ev...
In this manuscript, we study preconditioning techniques for optimal in-domain control of the Navier-...
In this manuscript, we study preconditioning techniques for optimal in-domain control of the Navier-...
Dropping some of the elements in the Jacobian matrix A produces a significant reduction of the fill-...
AbstractThis paper deals with the convergence analysis of various preconditioned iterations to compu...
We investigate the cost of preconditioning when solving large sparse saddlepoint linear systems wit...