In classical trust-region optimization algorithms, the radius of the trust region is reduced, kept constant, or enlarged after, respectively, unsuccessful, successful, and very successful iterations. We propose here to re. ne the empirical rules used for this update by the definition of a new set of iterations that we call "too successful iterations." At such iterations, a large reduction of the objective function is obtained despite a crude local approximation of the objective function; the trust region is thus kept nearly constant instead of being enlarged. The new update rules preserve the strong convergence property of traditional trust-region methods. They can also be generalized to define a self-adaptive trust-region algorithm along t...
Abstract. This paper presents an analytically robust, globally convergent approach to managing the u...
Trust-region methods are popular for nonlinear optimization problems. How to determine the predicted...
Line searches and trust regions are two techniques to globalize nonlinear optimization algorithms. W...
An improved trust region method for unconstrained optimization Jun Liu In this paper, a new trust re...
In this paper, we propose a new class of adaptive trust region methods for unconstrained optimizatio...
summary:Trust region methods are a class of effective iterative schemes in numerical optimization. I...
An algorithm for solving the problem of minimizing a non-linear function subject to equality constra...
In establishing global convergence results for trust region algorithms applied to unconstrained opti...
AbstractIn this paper, we propose a new trust region method for unconstrained optimization problems....
A new self-adaptive rule of trust region radius is introduced, which is given by a piecewise functio...
summary:We propose a new and efficient nonmonotone adaptive trust region algorithm to solve unconstr...
Abstract. This paper extends the known excellent global convergence properties of trust region algor...
In this short note, the recently popular modifier-adaptation framework for real-time optimization is...
Includes bibliographical references (l. 37).This project presents a new approach to Quasi-Newton met...
AbstractIn this paper, we incorporate a nonmonotone technique with the new proposed adaptive trust r...
Abstract. This paper presents an analytically robust, globally convergent approach to managing the u...
Trust-region methods are popular for nonlinear optimization problems. How to determine the predicted...
Line searches and trust regions are two techniques to globalize nonlinear optimization algorithms. W...
An improved trust region method for unconstrained optimization Jun Liu In this paper, a new trust re...
In this paper, we propose a new class of adaptive trust region methods for unconstrained optimizatio...
summary:Trust region methods are a class of effective iterative schemes in numerical optimization. I...
An algorithm for solving the problem of minimizing a non-linear function subject to equality constra...
In establishing global convergence results for trust region algorithms applied to unconstrained opti...
AbstractIn this paper, we propose a new trust region method for unconstrained optimization problems....
A new self-adaptive rule of trust region radius is introduced, which is given by a piecewise functio...
summary:We propose a new and efficient nonmonotone adaptive trust region algorithm to solve unconstr...
Abstract. This paper extends the known excellent global convergence properties of trust region algor...
In this short note, the recently popular modifier-adaptation framework for real-time optimization is...
Includes bibliographical references (l. 37).This project presents a new approach to Quasi-Newton met...
AbstractIn this paper, we incorporate a nonmonotone technique with the new proposed adaptive trust r...
Abstract. This paper presents an analytically robust, globally convergent approach to managing the u...
Trust-region methods are popular for nonlinear optimization problems. How to determine the predicted...
Line searches and trust regions are two techniques to globalize nonlinear optimization algorithms. W...