Determination of Feasible set of Solutions for Mixed Integer Nonlinear Optimization Problem
p. 123-134
Résumé
Mixed Integer Nonlinear Problems (referred as MINLP) is a nonlinear optimization problem, where two types of variables are present, namely integer variables and continuous ones. The presence of integer variables extends fundamentally the areas of MINLP applications. There is a linear goal function subject to linear and nonlinear constraints (quadratic forms). Two dimensional case of integer variables as well as continuous ones is analyzed. Main subject of interest is construction of feasible set of variables. Some numerical results will be given, where water distribution network will be interesting application area.
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Référence papier
Ryszard Klempous, « Determination of Feasible set of Solutions for Mixed Integer Nonlinear Optimization Problem », CASYS, 19 | 2006, 123-134.
Référence électronique
Ryszard Klempous, « Determination of Feasible set of Solutions for Mixed Integer Nonlinear Optimization Problem », CASYS [En ligne], 19 | 2006, mis en ligne le 22 August 2024, consulté le 20 September 2024. URL : http://popups.lib.uliege.be/1373-5411/index.php?id=2474
Auteur
Ryszard Klempous
The Institute of Computer Engineering, Control and Robotics
Wroclaw University of Technology
27 Wybrzeze Wyspiańskiego Street, 50-370, Wroclaw, Poland