TY - GEN
T1 - A Constraint Handling Method Based on Cyclic Random Sampling
AU - Deng, Jie
AU - Zhang, Geng
AU - Yin, Lizhi
AU - Yang, Xi
N1 - Publisher Copyright:
© 2024 IEEE.
PY - 2024
Y1 - 2024
N2 - Real-world optimization problems often come with constraints that limit the feasibility of solutions, posing challenges for finding viable solutions. While various constraint handling methods have been proposed, such as the penalty function method, superiority of feasible solutions, and stochastic ranking, analysis and experiments have revealed their limitations in tackling complex real-world optimization problems. This paper proposes a constraint handling method based on cyclic random sampling. The method involves narrowing down the scope of decision variables through cyclic sampling, altering the composition of original samples, and ultimately reducing the search for infeasible solutions, termed as the Boundary Sampling Update (BSU) method. The integration of the BSU method with the Differential Evolution (DE) optimization algorithm is applied to real-world optimization problems. The results demonstrate that the proposed BSU method effectively enhances the search performance of the algorithm.
AB - Real-world optimization problems often come with constraints that limit the feasibility of solutions, posing challenges for finding viable solutions. While various constraint handling methods have been proposed, such as the penalty function method, superiority of feasible solutions, and stochastic ranking, analysis and experiments have revealed their limitations in tackling complex real-world optimization problems. This paper proposes a constraint handling method based on cyclic random sampling. The method involves narrowing down the scope of decision variables through cyclic sampling, altering the composition of original samples, and ultimately reducing the search for infeasible solutions, termed as the Boundary Sampling Update (BSU) method. The integration of the BSU method with the Differential Evolution (DE) optimization algorithm is applied to real-world optimization problems. The results demonstrate that the proposed BSU method effectively enhances the search performance of the algorithm.
KW - boundary sampling update
KW - constraint optimization
KW - cyclic random sampling
UR - https://www.scopus.com/pages/publications/85208423711
U2 - 10.1109/ICCIA62557.2024.10719214
DO - 10.1109/ICCIA62557.2024.10719214
M3 - 会议稿件
AN - SCOPUS:85208423711
T3 - 2024 IEEE 9th International Conference on Computational Intelligence and Applications, ICCIA 2024
SP - 230
EP - 235
BT - 2024 IEEE 9th International Conference on Computational Intelligence and Applications, ICCIA 2024
PB - Institute of Electrical and Electronics Engineers Inc.
T2 - 9th IEEE International Conference on Computational Intelligence and Applications, ICCIA 2024
Y2 - 9 August 2024 through 11 August 2024
ER -