A new method is introduced for large scale convex constrained optimization. The general model algorithm involves, at each iteration, the approximate minimization of a convex quadratic on the feasible set of the original problem and global convergence is obtained by means of nonmonotone line searches. A speci c algorithm, the Inexact Spectral Projected Gradient method (ISPG), is implemented using inexact projections computed by Dykstra's alternating projection method and generates interior iterates. The ISPG method is a generalization of the Spectral Projected Gradient method (SPG), but can be used when projections are dicult to compute. Numerical results for constrained least-squares rectangular matrix problems are presented
. We describe an algorithm for optimization of a smooth function subject to general linear constrain...
In order to solve constrained optimization problems on convex sets, the class of scaled gradient pro...
We consider optimization methods for convex minimization problems under inexact information on the o...
The well-known Conjugate Gradient (CG) method minimizes a strictly convex quadratic function for s...
A method for linearly constrained optimization which modifies and generalizes recent box-constraint ...
The spectral projected gradient method (SPG) is an algorithm for large-scale bound-constrained optim...
Over the last two decades, it has been observed that using the gradient vector as a search direction...
Linearly constrained optimization problems with simple bounds are considered in the present work. Fi...
Abstract Fortran 77 software implementing the SPG method is introduced.SPG is a nonmonotone projecte...
The gradient projection algorithm plays an important role in solving constrained convex minimization...
The numerical solution of many engineering problems leads to the problem of minimizing a strictly co...
Nonmonotone projected gradient techniques are considered for the minimization of differentiable func...
AbstractIn a recent paper, a nonmonotone spectral projected gradient (SPG) method was introduced by ...
Inexact restoration (IR) is a well established technique for continuous minimization problems with c...
Inexact restoration (IR) is a well established technique for continuous minimization problems with c...
. We describe an algorithm for optimization of a smooth function subject to general linear constrain...
In order to solve constrained optimization problems on convex sets, the class of scaled gradient pro...
We consider optimization methods for convex minimization problems under inexact information on the o...
The well-known Conjugate Gradient (CG) method minimizes a strictly convex quadratic function for s...
A method for linearly constrained optimization which modifies and generalizes recent box-constraint ...
The spectral projected gradient method (SPG) is an algorithm for large-scale bound-constrained optim...
Over the last two decades, it has been observed that using the gradient vector as a search direction...
Linearly constrained optimization problems with simple bounds are considered in the present work. Fi...
Abstract Fortran 77 software implementing the SPG method is introduced.SPG is a nonmonotone projecte...
The gradient projection algorithm plays an important role in solving constrained convex minimization...
The numerical solution of many engineering problems leads to the problem of minimizing a strictly co...
Nonmonotone projected gradient techniques are considered for the minimization of differentiable func...
AbstractIn a recent paper, a nonmonotone spectral projected gradient (SPG) method was introduced by ...
Inexact restoration (IR) is a well established technique for continuous minimization problems with c...
Inexact restoration (IR) is a well established technique for continuous minimization problems with c...
. We describe an algorithm for optimization of a smooth function subject to general linear constrain...
In order to solve constrained optimization problems on convex sets, the class of scaled gradient pro...
We consider optimization methods for convex minimization problems under inexact information on the o...