A Bi-dimensional Search-based Algorithm for Unconstrained Optimization Problems

Author

Fang, Yuping ; Shao, Hu ; Zhao, Jian ; Wu, Ting

Author_Institution

Sch. of Sci., China Univ. of Min. & Technol., Xuzhou, China

fYear

2012

fDate

23-26 June 2012

Firstpage

500

Lastpage

503

Abstract

In this paper, a bi-dimensional search method is proposed for unconstrained optimization problems. Traditional methods for solving the unconstrained optimization problems are usually based on one-dimensional search (or line search) to determine the step size as these methods only use one descent direction in each iteration. When two search directions are available in each iteration, conventional one-dimensional search method is not applicable. In view of this, a bi-dimensional search method is needed to determine the step size vector. To do so, a mathematical formulation of the bi-dimensional search problem is presented. Then, using the second-order Taylor expansion the bi-dimensional search problem is approximately transformed into a least squares problem, which is easy to solve. The convergence of the proposed method is proved. Finally, numerical examples are given to demonstrate the efficiency of the proposed method.

Keywords

least squares approximations; optimisation; search problems; bi-dimensional search method; bi-dimensional search problem; bi-dimensional search-based algorithm; conventional one-dimensional search method; iteration method; least squares problem; line search; second-order Taylor expansion; unconstrained optimization problems; Convergence; Educational institutions; Equations; Optimization; Search problems; Vectors; bi-dimensional search; least quares; line search; unconstrained optimization;

fLanguage

English

Publisher

ieee

Conference_Titel

Computational Sciences and Optimization (CSO), 2012 Fifth International Joint Conference on

Conference_Location

Harbin

Print_ISBN

978-1-4673-1365-0

Type

conf

DOI

10.1109/CSO.2012.115

Filename

6274775