Add to ORKGWe define a new method for global optimization, the Homotopy Optimization Method (HOM). This method differs from previous homotopy and continuation methods in that its aim is to find a minimizer for each of a set of values of the homotopy parameter, rather than to follow a path of minimizers. We define a second method, called HOPE, by allowing HOM to follow an ensemble of points obtained by perturbation of previous ones. We relate this new method to standard methods such as simulated annealing and show under what circumstances it is superior. We present results of extensive numerical experiments demonstrating performance of HOM and HOPE
In this talk we consider the problem of finding all the global solutions of a nonlinear optimization...
Optimization is central to any problem involving decision making. The area of optimization has recei...
Abstract. Global optimization involves the difficult task of the identification of global extremitie...
Probability-one homotopy methods are a class of algorithms for solving nonlinear systems of equation...
An original approach to global optimization of continuous models is introduced. It belongs to the cl...
In optimization, most established search methods are local searches. Thus the development of a metho...
The focus of this dissertation is a new method for solving unconstrained min-imization problems|homo...
Models of chemical processes often require the solutions of optimization problems. Due to the comple...
We use a homotopy optimization method, HOPE, to minimize the potential energy asso-ciated with a pro...
Probability-one homotopy methods are a class of algorithms for solving nonlinear systems of equation...
The basic theory for probability one globally convergent homotopy algorithms was developed in 1976, ...
Several algorithms in optimization can be viewed as following a solution as a parameter or set of pa...
Optimization method is widely used in mechanics and engineering, economics, operations research and ...
In this work we consider the problem of finding all the global maximizers of a given nonlinear optim...
In this paper we consider the problem of finding all the global maximizers of a given nonlinear opti...
In this talk we consider the problem of finding all the global solutions of a nonlinear optimization...
Optimization is central to any problem involving decision making. The area of optimization has recei...
Abstract. Global optimization involves the difficult task of the identification of global extremitie...
Probability-one homotopy methods are a class of algorithms for solving nonlinear systems of equation...
An original approach to global optimization of continuous models is introduced. It belongs to the cl...
In optimization, most established search methods are local searches. Thus the development of a metho...
The focus of this dissertation is a new method for solving unconstrained min-imization problems|homo...
Models of chemical processes often require the solutions of optimization problems. Due to the comple...
We use a homotopy optimization method, HOPE, to minimize the potential energy asso-ciated with a pro...
Probability-one homotopy methods are a class of algorithms for solving nonlinear systems of equation...
The basic theory for probability one globally convergent homotopy algorithms was developed in 1976, ...
Several algorithms in optimization can be viewed as following a solution as a parameter or set of pa...
Optimization method is widely used in mechanics and engineering, economics, operations research and ...
In this work we consider the problem of finding all the global maximizers of a given nonlinear optim...
In this paper we consider the problem of finding all the global maximizers of a given nonlinear opti...
In this talk we consider the problem of finding all the global solutions of a nonlinear optimization...
Optimization is central to any problem involving decision making. The area of optimization has recei...
Abstract. Global optimization involves the difficult task of the identification of global extremitie...