We consider an iterative preconditioning technique for large scale optimization, where the objective function is possibly non-convex. First, we refer to the solution of a generic indefinite linear system by means of a Krylov subspace method, and describe the iterative construction of the preconditioner which does not involve matrices products or matrix storage. The set of directions generated by the Krylov subspace method is also used, as by product, to provide an approximate inverse of the system matrix. Then, we experience our method within Truncated Newton schemes for large scale unconstrained optimization, in order to speed up the solution of the Newton equation. Actually, we use a Krylov subspace method to approximately solve the Newto...
We propose a class of preconditioners, which are also tailored for symmetric linear systems from lin...
We propose a class of preconditioners for large positive definite linear systems, arising in nonlin...
After briefly recalling some relevant approaches for preconditioning large symmetric linear systems,...
We consider an iterative preconditioning technique for large scale optimization, where the objective...
We consider an iterative preconditioning technique for non-convex large scale optimization. First, w...
We consider an iterative preconditioning technique for large scale optimization, where the objective...
We consider an iterative preconditioning technique for non-convex large scale optimization. First, w...
We introduce a class of positive definite preconditioners for the solution of large symmetric indefi...
After briefly recalling some relevant approaches for preconditioning large symmetric linear systems,...
This paper deals with the preconditioning of truncated Newton methods for the solution of large scal...
In this thesis we propose new iteratively constructed preconditioners, to be paired with Conjugate G...
We propose a class of preconditioners, which are also tailored for symmetric linear systems from lin...
We propose a class of preconditioners for large positive definite linear systems, arising in nonline...
Recently, subspace quasi-Newton (SQN) method has been widely used in solving large scale unconstrain...
We propose a class of preconditioners, which are also tailored for symmetric linear systems from lin...
We propose a class of preconditioners for large positive definite linear systems, arising in nonlin...
After briefly recalling some relevant approaches for preconditioning large symmetric linear systems,...
We consider an iterative preconditioning technique for large scale optimization, where the objective...
We consider an iterative preconditioning technique for non-convex large scale optimization. First, w...
We consider an iterative preconditioning technique for large scale optimization, where the objective...
We consider an iterative preconditioning technique for non-convex large scale optimization. First, w...
We introduce a class of positive definite preconditioners for the solution of large symmetric indefi...
After briefly recalling some relevant approaches for preconditioning large symmetric linear systems,...
This paper deals with the preconditioning of truncated Newton methods for the solution of large scal...
In this thesis we propose new iteratively constructed preconditioners, to be paired with Conjugate G...
We propose a class of preconditioners, which are also tailored for symmetric linear systems from lin...
We propose a class of preconditioners for large positive definite linear systems, arising in nonline...
Recently, subspace quasi-Newton (SQN) method has been widely used in solving large scale unconstrain...
We propose a class of preconditioners, which are also tailored for symmetric linear systems from lin...
We propose a class of preconditioners for large positive definite linear systems, arising in nonlin...
After briefly recalling some relevant approaches for preconditioning large symmetric linear systems,...