Enhancements on the hyperplane arrangements in mixed integer techniques

Author

Stoican, Florin ; Prodan, Ionela ; Olaru, Sorin

Author_Institution

Autom. Control Dept., PELEC Syst. Sci. (E3S), Gif-sur-Yvette, France

fYear

2011

fDate

12-15 Dec. 2011

Firstpage

3986

Lastpage

3991

Abstract

The current paper addresses the problem of optimizing a cost function over a non-convex and possibly non-connected feasible region. A classical approach for solving this type of optimization problem is based on Mixed integer technique. The exponential complexity as a function of the number of binary variables used in the problem formulation highlights the importance of reducing them. Previous work which minimize the number of binary variables is revisited and enhanced. Practical limitations of the procedure are discussed and a typical control application, the control of Multi-Agent Systems is exemplified.

Keywords

collision avoidance; computational complexity; concave programming; integer programming; multi-agent systems; multi-robot systems; binary variables; control application; cost function; exponential complexity; hyperplane arrangement; mixed integer programming; multiagent systems control; nonconnected feasible region; nonconvex feasible region; optimization problem; Bismuth; Collision avoidance; Complexity theory; Context; Hypercubes; Merging; Optimization;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control and European Control Conference (CDC-ECC), 2011 50th IEEE Conference on

Conference_Location

Orlando, FL

ISSN

0743-1546

Print_ISBN

978-1-61284-800-6

Electronic_ISBN

0743-1546

Type

conf

DOI

10.1109/CDC.2011.6161361

Filename

6161361