测试足球联赛竞赛算法与十种流行的元启发式桁架结构尺寸优化算法的比较

N. Moosaviana, H. Moosavian
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引用次数: 6

摘要

近年来,人们提出了许多元启发式算法来优化各种问题。其中一些方法最初是针对连续优化问题提出的,而另一些方法只适用于离散优化问题。在文献中,桁架结构的尺寸优化是离散优化问题之一,许多元启发式算法都能解决这一问题。为了寻找一种高效可靠的桁架结构优化算法,本文研究了离散优化算法SLC算法和十种流行且功能强大的求解方法,并对其进行了统计分析。SLC算法的基本思想受到职业足球联赛的启发,基于球队之间的竞争,以达到更好的排名和球员是最好的。为了优化目标和使初始群体收敛到全局最优,不同的队伍相互竞争,以获得联赛表中最好的排名,每个队伍的球员之间进行内部竞争,以提高个人水平。近年来,SLC算法作为一种具有成熟算子的多种群算法被应用于各种问题的优化。本文通过对5个数值算例进行优化,验证了不同求解方法在桁架结构优化设计中的性能,结果表明,SLC算法在众多算法中具有较好的求解能力。换句话说,SLC可以在一些其他算法无法找到的例子中发现新的局部最优解。doi: 10.5829 / ije.2017.30.07a.01
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Testing Soccer League Competition Algorithm in Comparison with Ten Popular Meta-heuristic Algorithms for Sizing Optimization of Truss Structures
Recently, many meta-heuristic algorithms are proposed for optimization of various problems. Some of them originally are presented for continuous optimization problems and some others are just applicable for discrete ones. In the literature, sizing optimization of truss structures is one of the discrete optimization problems which is solved by many meta-heuristic algorithms. In this paper, in order to discover an efficient and reliable algorithm for optimization of truss structures, a discrete optimizer, entitled Soccer League Competition (SLC) algorithm and ten popular and powerful solvers are examined and statistical analysis is carried out for them. The fundamental idea of SLC algorithm is inspired from a professional soccer league and based on the competitions among teams to achieve better ranking and players to be the best. For optimization purpose and convergence of the initial population to the global optimum, different teams compete to take the possession of the best rating positions in the league table and the internal competitions are taken place between players in each team for personal improvements. Recently, SLC as a multi-population algorithm with developed operators has been applied for optimization of various problems. In this paper, for demonstrating the performance of the different solvers for optimal design of truss structures, five numerical examples will be optimized and the results show that proposed SLC algorithm is able to find better solutions among other algorithms. In other words, SLC can discover new local optimal solutions for some examples where other algorithms fail to find that one. doi: 10.5829/ije.2017.30.07a.01
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