For optimization problems associated with engineering design, parameter estimation, image reconstruction, and other optimization/simulation applications, low accuracy function and gradient values are frequently much less expensive to obtain than high accuracy values. Here, researchers investigate the computational performance of trust region methods for nonlinear optimization when high accuracy evaluations are unavailable or prohibitively expensive, and confirm earlier theoretical predictions when the algorithm is convergent even with relative gradient errors of 0.5 or more. The proper choice of the amount of accuracy to use in function and gradient evaluations can result in orders-of-magnitude savings in computational cost
The conditional, unconditional, or the exact maximum likelihood estimation and the least-squares est...
Genetic algorithms for mathematical function optimization are modeled on search strategies employed ...
The rapid development of artificial intelligence and computational sciences has attracted much more ...
The numerical operations involved in a currently used optimization technique are discussed and analy...
International audienceThis short note considers an efficient variant of the trust-region algorithm w...
Numerical optimization has been successfully applied to multidisciplinary design optimizations such ...
Unconstrained minimization algorithms have been critically evaluated for their effectiveness in solv...
This paper presents a new sequential method for constrained non-linear optimization problems.The pri...
Efficient optimization algorithms are required to reduce the computational costs of Multidisciplinar...
Parameter optimization problems constrained by partial differential equations (PDEs) appear in many ...
It is standard engineering practice to use approximation models in place of expensive simulations to...
In this thesis, we focus on problems in which the derivative of the objective function is either una...
This thesis concerns the development and analysis of derivative-free optimization algorithms for sim...
Engineering optimization problems involve minimizing some function subject to constraints. In areas ...
The study of first-order optimization is sensitive to the assumptions made on the objective function...
The conditional, unconditional, or the exact maximum likelihood estimation and the least-squares est...
Genetic algorithms for mathematical function optimization are modeled on search strategies employed ...
The rapid development of artificial intelligence and computational sciences has attracted much more ...
The numerical operations involved in a currently used optimization technique are discussed and analy...
International audienceThis short note considers an efficient variant of the trust-region algorithm w...
Numerical optimization has been successfully applied to multidisciplinary design optimizations such ...
Unconstrained minimization algorithms have been critically evaluated for their effectiveness in solv...
This paper presents a new sequential method for constrained non-linear optimization problems.The pri...
Efficient optimization algorithms are required to reduce the computational costs of Multidisciplinar...
Parameter optimization problems constrained by partial differential equations (PDEs) appear in many ...
It is standard engineering practice to use approximation models in place of expensive simulations to...
In this thesis, we focus on problems in which the derivative of the objective function is either una...
This thesis concerns the development and analysis of derivative-free optimization algorithms for sim...
Engineering optimization problems involve minimizing some function subject to constraints. In areas ...
The study of first-order optimization is sensitive to the assumptions made on the objective function...
The conditional, unconditional, or the exact maximum likelihood estimation and the least-squares est...
Genetic algorithms for mathematical function optimization are modeled on search strategies employed ...
The rapid development of artificial intelligence and computational sciences has attracted much more ...