水准点(测量)
早熟收敛
莱维航班
局部最优
计算机科学
维数之咒
趋同(经济学)
鲸鱼
数学优化
弹道
算法
轨迹优化
优化算法
数学
人工智能
粒子群优化
最优控制
经济增长
随机游动
生物
渔业
天文
统计
经济
大地测量学
地理
物理
作者
Ying Ling,Yongquan Zhou,Qifang Luo
出处
期刊:IEEE Access
[Institute of Electrical and Electronics Engineers]
日期:2017-01-01
卷期号:5: 6168-6186
被引量:390
标识
DOI:10.1109/access.2017.2695498
摘要
The whale optimization algorithm (WOA) has been shown to be powerful in searching for an optimal solution. This paper proposes an improvement to the whale optimization algorithm that is based on a Lévy flight trajectory and called the Lévy flight trajectory-based whale optimization algorithm (LWOA). The LWOA makes the WOA faster and more robust and avoids premature convergence. The Lévy flight trajectory is helpful for increasing the diversity of the population against premature convergence and enhancing the capability of jumping out of local optimal optima. This method helps obtaining a better tradeoff between the exploration and exploitation of the WOA. The proposed algorithm is characterized by quick convergence and high precision, and it can effectively get rid of a local optimum. The LWOA is further compared with other well-known nature-inspired algorithms on 23 benchmarks and solving infinite impulse response model identification. The statistical results on the benchmark functions show that the LWOA can significantly outperform others on a majority of the benchmark functions, especially in solving an optimization problem that has high dimensionality. Additionally, the superior identification capability of the proposed algorithm is evident from the results obtained through the simulation study compared with other algorithms. All the results prove the superiority of the LWOA.
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