Linearly constrained optimization problems with simple bounds are considered in the present work. First, a preconditioned spectral gradient method is defined for the case in which no simple bounds are present. This algorithm can be viewed as a quasi-Newton method in which the approximate Hessians satisfy a weak secant equation. The spectral choice of steplength is embedded into the Hessian approximation and the whole process is combined with a nonmonotone line search strategy. The simple bounds are then taken into account by placing them in an exponential penalty term that modifies the objective function. The exponential penalty scheme defines the outer iterations of the process. Each outer iteration involves the application of the previous...
The role of the steplength selection strategies in gradient methods has been widely in- vestigated i...
We propose a gradient-based method for quadratic programming problems with a single linear constrain...
1 Preconditioning Indefinite Systems in Interior Point Methods for Large Scale Linear Optimization A...
Linearly constrained optimization problems with simple bounds are considered in the present work. Fi...
Over the last two decades, it has been observed that using the gradient vector as a search direction...
A new method is introduced for large scale convex constrained optimization. The general model algor...
The numerical solution of many engineering problems leads to the problem of minimizing a strictly co...
A method for linearly constrained optimization which modifies and generalizes recent box-constraint ...
We propose a new framework for the application of preconditioned conjugate gradients in the solution...
The implementation of the recently proposed semi-monotonic augmented Lagrangian algorithm for the so...
Elliptic optimal control problems with pointwise state gradient constraints are considered. A quadra...
Every Newton step in an interior-point method for optimization requires a solution of a symmetric in...
We propose a framework for building preconditioners for sequences of linear systems of the form (A+Δ...
The well-known Conjugate Gradient (CG) method minimizes a strictly convex quadratic function for s...
In 1988, Barzilai and Borwein published a pioneering paper which opened the way to inexpensively acc...
The role of the steplength selection strategies in gradient methods has been widely in- vestigated i...
We propose a gradient-based method for quadratic programming problems with a single linear constrain...
1 Preconditioning Indefinite Systems in Interior Point Methods for Large Scale Linear Optimization A...
Linearly constrained optimization problems with simple bounds are considered in the present work. Fi...
Over the last two decades, it has been observed that using the gradient vector as a search direction...
A new method is introduced for large scale convex constrained optimization. The general model algor...
The numerical solution of many engineering problems leads to the problem of minimizing a strictly co...
A method for linearly constrained optimization which modifies and generalizes recent box-constraint ...
We propose a new framework for the application of preconditioned conjugate gradients in the solution...
The implementation of the recently proposed semi-monotonic augmented Lagrangian algorithm for the so...
Elliptic optimal control problems with pointwise state gradient constraints are considered. A quadra...
Every Newton step in an interior-point method for optimization requires a solution of a symmetric in...
We propose a framework for building preconditioners for sequences of linear systems of the form (A+Δ...
The well-known Conjugate Gradient (CG) method minimizes a strictly convex quadratic function for s...
In 1988, Barzilai and Borwein published a pioneering paper which opened the way to inexpensively acc...
The role of the steplength selection strategies in gradient methods has been widely in- vestigated i...
We propose a gradient-based method for quadratic programming problems with a single linear constrain...
1 Preconditioning Indefinite Systems in Interior Point Methods for Large Scale Linear Optimization A...