数学优化
讨价还价问题
多目标优化
有限元法
计算机科学
最优化问题
博弈论
空格(标点符号)
缩小
功能(生物学)
订单(交换)
数学
数理经济学
工程类
经济
生物
操作系统
进化生物学
结构工程
财务
作者
Lorenzo Iorio,Lionel Fourment,Stéphane Marie,Matteo Strano
出处
期刊:Key Engineering Materials
日期:2015-07-10
卷期号:651-653: 1387-1393
被引量:2
标识
DOI:10.4028/www.scientific.net/kem.651-653.1387
摘要
The Game Theory is a good method for finding a compromise between two players in a bargaining problem. The Kalai and Smorodinsky (K-S) method is a solution the bargaining problem where players make decisions in order to maximize their own utility, with a cooperative approach. Interesting applications of the K-S method can be found in engineering multi-objective optimization problems, where two or more functions must be minimized. The aim of this paper is to develop an optimization algorithm aimed at rapidly finding the Kalai and Smorodinsky solution, where the objective functions are considered as players in a bargaining problem, avoiding the search for the Pareto front. The approach uses geometrical consideration in the space of the objective functions, starting from the knowledge of the so-called Utopia and Nadir points. An analytical solution is proposed and initially tested with a simple minimization problem based on a known mathematical function. Then, the algorithm is tested (thanks to a user friendly routine built-in the finite element code Forge®) for FEM optimization problem of a wire drawing operation, with the objective of minimizing the pulling force and the material damage. The results of the simulations are compared to previous works done with others methodologies.
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