A relative feasibility degree based approach for constrained optimization problems

被引:2
|
作者
Chenggang CUIYanjun LITiejun WU Department of Control Science and EngineeringZhejiang UniversityHangzhou China [310027 ]
机构
来源
Journal of Zhejiang University-Science C(Computer & Electronics) | 2010年 / 11卷 / 04期
关键词
D O I
暂无
中图分类号
TP18 [人工智能理论];
学科分类号
081104 ; 0812 ; 0835 ; 1405 ;
摘要
Based on the ratio of the size of the feasible region of constraints to the size of the feasible region of a constrained optimization problem,we propose a new constraint handling approach to improve the efficiency of heuristic search methods in solving the constrained optimization problems.In the traditional classification of a solution candidate,it is either a feasible or an infeasible solution.To refine this classification,a new concept about the relative feasibility degree of a solution candidate is proposed to represent the amount by which the 'feasibility' of the solution candidate exceeds that of another candidate.Relative feasibility degree based selection rules are also proposed to enable evolutionary computation techniques to accelerate the search process of reaching a feasible region.In addition,a relative feasibility degree based differential evolution algorithm is derived to solve constraint optimization problems.The proposed approach is tested with nine benchmark problems.Results indicate that our approach is very competitive compared with four existing state-of-the-art techniques,though still sensitive to the intervals of control parameters of the differential evolution.
引用
收藏
页码:249 / 260
页数:12
相关论文
共 50 条
  • [21] Biogeography-based optimization for constrained optimization problems
    Boussaid, Ilhem
    Chatterjee, Amitava
    Siarry, Patrick
    Ahmed-Nacer, Mohamed
    COMPUTERS & OPERATIONS RESEARCH, 2012, 39 (12) : 3293 - 3304
  • [22] A GRASP based solution approach to solve cardinality constrained portfolio optimization problems
    Baykasoglu, Adil
    Yunusoglu, Mualla Gonca
    Ozsoydan, F. Burcin
    COMPUTERS & INDUSTRIAL ENGINEERING, 2015, 90 : 339 - 351
  • [23] Feasibility enhanced particle swarm optimization for constrained mechanical design problems
    Hasanoglu, Mehmet Sinan
    Dolen, Melik
    PROCEEDINGS OF THE INSTITUTION OF MECHANICAL ENGINEERS PART C-JOURNAL OF MECHANICAL ENGINEERING SCIENCE, 2018, 232 (02) : 381 - 400
  • [24] HIERARCHICAL APPROACH TO STATE SPACE CONSTRAINED OPTIMIZATION PROBLEMS
    HIRVONEN, J
    HAKKALA, L
    INTERNATIONAL JOURNAL OF SYSTEMS SCIENCE, 1979, 10 (11) : 1311 - 1321
  • [25] AN ALTERNATIVE APPROACH TO THE OPTIMIZATION OF CONSTRAINED DESIGN-PROBLEMS
    STEPHANOPOULOS, G
    STEPHANOPOULOS, G
    CHEMICAL ENGINEERING COMMUNICATIONS, 1980, 4 (2-3) : 173 - 180
  • [26] Probability Collectives: A Distributed Optimization Approach for Constrained Problems
    Kulkarni, Anand Jayant
    Tai, Kang
    2010 IEEE CONGRESS ON EVOLUTIONARY COMPUTATION (CEC), 2010,
  • [27] An Approach for Generating Test Problems of Constrained Global Optimization
    Gergel, Victor
    LEARNING AND INTELLIGENT OPTIMIZATION (LION 11 2017), 2017, 10556 : 314 - 319
  • [28] Solving constrained optimization problems based on rBOA
    Feng, Pengcheng
    Cai, Zixing
    Wang, Yong
    Huazhong Keji Daxue Xuebao (Ziran Kexue Ban)/Journal of Huazhong University of Science and Technology (Natural Science Edition), 2008, 36 (SUPPL. 1): : 314 - 316
  • [29] A Hybrid PSO-DE Intelligent Algorithm for Solving Constrained Optimization Problems Based on Feasibility Rules
    Guo, Eryang
    Gao, Yuelin
    Hu, Chenyang
    Zhang, Jiaojiao
    MATHEMATICS, 2023, 11 (03)
  • [30] Fuzzy optimization problems based on inequality degree
    Li, FC
    Liu, M
    Wu, C
    Luo, SX
    2002 INTERNATIONAL CONFERENCE ON MACHINE LEARNING AND CYBERNETICS, VOLS 1-4, PROCEEDINGS, 2002, : 1566 - 1570
12345