Showing total 2 results

1. A Velocity-Combined Local Best Particle Swarm Optimization Algorithm for Nonlinear Equations.

Author

Lian, Zhigang, Wang, Songhua, and Chen, Yangquan

Subjects

*PARTICLE swarm optimization, *NONLINEAR equations, *MATHEMATICAL optimization, *QUASI-Newton methods, *ALGORITHMS, *COMBINATORIAL optimization

Abstract

Many people use traditional methods such as quasi-Newton method and Gauss–Newton-based BFGS to solve nonlinear equations. In this paper, we present an improved particle swarm optimization algorithm to solve nonlinear equations. The novel algorithm introduces the historical and local optimum information of particles to update a particle's velocity. Five sets of typical nonlinear equations are employed to test the quality and reliability of the novel algorithm search comparing with the PSO algorithm. Numerical results show that the proposed method is effective for the given test problems. The new algorithm can be used as a new tool to solve nonlinear equations, continuous function optimization, etc., and the combinatorial optimization problem. The global convergence of the given method is established. [ABSTRACT FROM AUTHOR]

Published

2020

2. Stabilizing of Subspaces Based on DPGA and Chaos Genetic Algorithm for Optimizing State Feedback Controller.

Author

Hosseinpour, M., Nikdel, P., Badamchizadeh, M. A., and Poor, M. A.

Subjects

*STATE feedback (Feedback control systems), *ALGORITHMS, *FEEDBACK control systems, *MATHEMATICAL optimization, *COMBINATORIAL optimization, *STOCHASTIC convergence

Abstract

The main purpose of the paper is to optimize state feedback parameters using intelligent method, GA, Hermite-Biehler, and chaos algorithm. GA is implemented for local search but it has some deficiencies such as trapping into a local minimum and slow convergence, so the combination of Hermite-Biehler and chaos algorithm has been added to GA to avoid its deficiencies. Dividing search space is usually done by distributed population genetic algorithm (DPGA).Moreover, using generalized Hermite-Biehler Theorem can find the domain of parameters. In order to speed up the convergence at the first step, Hermite-Biehler method finds some intervals for controller, in the next step the GA will be added, and, finally, chaos disturbance will help the algorithm to reach a global minimum. Therefore, the proposed method can optimize the parameters of the state feedback controller. [ABSTRACT FROM AUTHOR]

Published

2012