AbstractIn this paper, we propose a trust region method for unconstrained optimization that can be regarded as a combination of conic model, nonmonotone and line search techniques. Unlike in traditional trust region methods, the subproblem of our algorithm is the conic minimization subproblem; moreover, our algorithm performs a nonmonotone line search to find the next iteration point when a trial step is not accepted, instead of resolving the subproblem. The global and superlinear convergence results for the algorithm are established under reasonable assumptions. Numerical results show that the new method is efficient for unconstrained optimization problems
AbstractIn this paper, we combine the new trust region subproblem proposed in [1] with the nonmonoto...
In this study, we propose a trust-region-based procedure to solve unconstrained optimization problem...
AbstractIn this paper we propose a nonmonotone trust region method. Unlike traditional nonmonotone t...
AbstractIn this paper, we present a nonmonotone conic trust region method based on line search techn...
AbstractIn this paper, we present a new nonmonotone trust-region method of conic model for solving u...
AbstractThis paper concerns a nonmonotone line search technique and its application to the trust reg...
In this paper, we propose a nonmonotone trust region method for bound constrained optimization probl...
AbstractIn this paper, we present a nonmonotone trust-region method of conic model for unconstrained...
AbstractIn this paper we consider a conic trust-region method for unconstrained optimization problem...
AbstractIn this paper, we propose a new trust region method for unconstrained optimization problems....
AbstractIn this paper we combine a reduced Hessian method with a mixed strategy using both trust reg...
An improved trust region method for unconstrained optimization Jun Liu In this paper, a new trust re...
A new trust region method is presented, which combines nonmonotone line search technique, a self-ada...
AbstractIn this paper, a new trust region algorithm is proposed for solving unconstrained optimizati...
AbstractIn this paper, we propose a new nonmonotone line search technique for unconstrained optimiza...
AbstractIn this paper, we combine the new trust region subproblem proposed in [1] with the nonmonoto...
In this study, we propose a trust-region-based procedure to solve unconstrained optimization problem...
AbstractIn this paper we propose a nonmonotone trust region method. Unlike traditional nonmonotone t...
AbstractIn this paper, we present a nonmonotone conic trust region method based on line search techn...
AbstractIn this paper, we present a new nonmonotone trust-region method of conic model for solving u...
AbstractThis paper concerns a nonmonotone line search technique and its application to the trust reg...
In this paper, we propose a nonmonotone trust region method for bound constrained optimization probl...
AbstractIn this paper, we present a nonmonotone trust-region method of conic model for unconstrained...
AbstractIn this paper we consider a conic trust-region method for unconstrained optimization problem...
AbstractIn this paper, we propose a new trust region method for unconstrained optimization problems....
AbstractIn this paper we combine a reduced Hessian method with a mixed strategy using both trust reg...
An improved trust region method for unconstrained optimization Jun Liu In this paper, a new trust re...
A new trust region method is presented, which combines nonmonotone line search technique, a self-ada...
AbstractIn this paper, a new trust region algorithm is proposed for solving unconstrained optimizati...
AbstractIn this paper, we propose a new nonmonotone line search technique for unconstrained optimiza...
AbstractIn this paper, we combine the new trust region subproblem proposed in [1] with the nonmonoto...
In this study, we propose a trust-region-based procedure to solve unconstrained optimization problem...
AbstractIn this paper we propose a nonmonotone trust region method. Unlike traditional nonmonotone t...