Title :
A symbolic-numeric approach to multi-parametric programming for control design
Author_Institution :
Design Innovation Lab., FUJITSU Labs. Ltd., Kanagawa, Japan
Abstract :
In this paper we propose a new method which enables us to obtain exact parametric solutions for multi-parametric programming problems, that is the optimal solutions as a function of the varying parameters, using symbolic quantifier elimination technique. The existing methods for multi-parametric programming are based on the sensitivity analysis theory and, in general produce approximate optimal solutions. Therefore usually there exist significant gaps between obtained numerical approximated solutions and exact ones, in particular, for multi-parametric nonlinear programming. It is desired to resolve this issue. Our method based on symbolic computation will remedy this drawback.
Keywords :
approximation theory; control system CAD; mathematics computing; nonlinear programming; sensitivity analysis; symbol manipulation; Maple QE tool; control design; multiparametric nonlinear programming problem; multiparametric optimization problem; numerically-approximate optimal solution; parametric solution; sensitivity analysis theory; symbolic quantifier elimination technique; symbolic-numeric computation approach; Control design; Functional programming; Iterative algorithms; Mathematical programming; Mathematics; Partitioning algorithms; Piecewise linear approximation; Piecewise linear techniques; Sensitivity analysis; Technological innovation; complete map of optimal solution; multi-parametric optimization; real quantifier elimination;
Conference_Titel :
ICCAS-SICE, 2009
Conference_Location :
Fukuoka
Print_ISBN :
978-4-907764-34-0
Electronic_ISBN :
978-4-907764-33-3
