多目标优化问题中目标函数的性质及搜索算法

A. V. Smirnov
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引用次数: 2

摘要

目标。获得帕累托最优解的常用方法是在其他质量指标的限制下最小化选定的质量指标,这些指标的值因此是预设的。对于标量目标函数,寻求包含受限指标作为惩罚项的全局最小值。然而,这样一个函数的地形有陡峭的上升区域,这使得寻找全局最小值变得非常复杂。这项工作比较了各种启发式算法在解决这类问题中的结果。此外,还研究了用序列二次规划(SQP)方法求解这类问题的可能性,其中限制条件不作为惩罚项,而是包含在拉格朗日函数中。利用两个解析定义的目标函数和模拟滤波器特性多目标优化问题中遇到的两个目标函数进行了实验。在MATLAB环境下实现了相应的算法。唯一能得到所有函数最优解的启发式算法是粒子群优化算法。序列二次规划(sequential quadratic programming, SQP)算法适用于其中一种解析定义目标函数和一种滤波优化目标函数,且在解搜索速度和精度上明显优于启发式算法。然而,对于另外两个函数,发现这种方法无法找到正确的解。一个热门问题是基于对决定质量指标的函数的性质的初步分析,估计所考虑的方法对获得帕累托最优解的适用性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Properties of objective functions and search algorithms in multi-objective optimization problems
Objectives. A frequently used method for obtaining Pareto-optimal solutions is to minimize a selected quality index under restrictions of the other quality indices, whose values are thus preset. For a scalar objective function, the global minimum is sought that contains the restricted indices as penalty terms. However, the landscape of such a function has steep-ascent areas, which significantly complicate the search for the global minimum. This work compared the results of various heuristic algorithms in solving problems of this type. In addition, the possibility of solving such problems using the sequential quadratic programming (SQP) method, in which the restrictions are not imposed as the penalty terms, but included into the Lagrange function, was investigated.Methods. The experiments were conducted using two analytically defined objective functions and two objective functions that are encountered in problems of multi-objective optimization of characteristics of analog filters. The corresponding algorithms were realized in the MATLAB environment.Results. The only heuristic algorithm shown to obtain the optimal solutions for all the functions is the particle swarm optimization algorithm. The sequential quadratic programming (SQP) algorithm was applicable to one of the analytically defined objective functions and one of the filter optimization objective functions, as well as appearing to be significantly superior to heuristic algorithms in speed and accuracy of solutions search. However, for the other two functions, this method was found to be incapable of finding correct solutions.Conclusions. A topical problem is the estimation of the applicability of the considered methods to obtaining Pareto-optimal solutions based on preliminary analysis of properties of functions that determine the quality indices.
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