Add to ORKGWe investigate parallelization and performance of the discrete gradient method of nonsmooth optimization. This derivative free method is shown to be an effective optimization tool, able to skip many shallow local minima of nonconvex nondifferentiable objective functions. Although this is a sequential iterative method, we were able to parallelize critical steps of the algorithm, and this lead to a significant improvement in performance on multiprocessor computer clusters. We applied this method to a difficult polyatomic clusters problem in computational chemistry, and found this method to outperform other algorithms.E
Discrete optimization problems arise in a variety of domains such as VLSI design, transportation, sc...
Real life optimization often concerns difficult objective functions, in two aspects, namely that gra...
Real life optimization often concerns difficult objective functions, in two aspects, namely that gra...
We investigate parallelization and performance of the discrete gradient method of nonsmooth optimiza...
We investigate parallelization and performance of the discrete gradient method of nonsmooth optimiza...
In this chapter, the notion of a discrete gradient is introduced and it is shown that the discrete g...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
Typically, practical nonsmooth optimization problems involve functions with hundreds of variables. M...
Typically, practical nonsmooth optimization problems involve functions with hundreds of variables. M...
Typically, practical nonsmooth optimization problems involve functions with hundreds of variables. M...
Discrete optimization problems (DOPs) arise in various applications such as planning, scheduling, co...
In this two-part paper, we propose a general algorithmic framework for the minimization of a nonconv...
A new derivative-free method is developed for solving unconstrained nonsmooth optimization problems....
Discrete optimization problems arise in a variety of domains such as VLSI design, transportation, sc...
Real life optimization often concerns difficult objective functions, in two aspects, namely that gra...
Real life optimization often concerns difficult objective functions, in two aspects, namely that gra...
We investigate parallelization and performance of the discrete gradient method of nonsmooth optimiza...
We investigate parallelization and performance of the discrete gradient method of nonsmooth optimiza...
In this chapter, the notion of a discrete gradient is introduced and it is shown that the discrete g...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
Typically, practical nonsmooth optimization problems involve functions with hundreds of variables. M...
Typically, practical nonsmooth optimization problems involve functions with hundreds of variables. M...
Typically, practical nonsmooth optimization problems involve functions with hundreds of variables. M...
Discrete optimization problems (DOPs) arise in various applications such as planning, scheduling, co...
In this two-part paper, we propose a general algorithmic framework for the minimization of a nonconv...
A new derivative-free method is developed for solving unconstrained nonsmooth optimization problems....
Discrete optimization problems arise in a variety of domains such as VLSI design, transportation, sc...
Real life optimization often concerns difficult objective functions, in two aspects, namely that gra...
Real life optimization often concerns difficult objective functions, in two aspects, namely that gra...