用分段凸变换求解非凸优化问题的算法

IF 0.3 Q4 MATHEMATICS Matematika Pub Date : 2018-12-02 DOI:10.11113/MATEMATIKA.V34.N2.977
Lee Chang Kerk, Rohanin Ahmad
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引用次数: 1

摘要

优化是任何涉及决策的问题的核心。30多年来,优化问题一直受到人们的极大关注,至今在研究领域仍很受欢迎。本文将介绍一种称为Kerk和Rohanin可信区间的全局优化方法。所介绍的方法能够通过将非凸优化问题转换为分段凸优化问题来识别所有的局部解。应用了一种只考虑函数上存在极小值的凸部分的机制。该机制允许该方法自动过滤掉凹形部分和一些不相关的部分。已识别的凸部分称为可信区间。本文给出了该方法的下降性质和全局收敛性。通过15个测试问题,验证了该算法在全局极小值定位中的能力。
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Algorithm for Solution of Non-convex Optimization Problem Through Piece-wise Convex Transformation
Optimization is central to any problem involving decision making. Thearea of optimization has received enormous attention for over 30 years and it is still popular in research field to this day. In this paper, a global optimization method called Kerk and Rohanin’s Trusted Interval will be introduced. The method introduced is able to identify all local solutions by converting non-convex optimization problems into piece-wise convex optimization problems. A mechanism which only considers the convex part where minimizers existed on a function is applied. This mechanism allows the method to filter out concave parts and some unrelated parts automatically. The identified convex parts are called trusted intervals. The descent property and the globally convergent of the method was shown in this paper. 15 test problems have been used to show the ability of the algorithm proposed in locating global minimizer.
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Matematika
Matematika MATHEMATICS-
自引率
25.00%
发文量
0
审稿时长
24 weeks
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