Bounds on eigenvalues of real symmetric interval matrices for αBB method in global optimization

Q3 Decision Sciences Yugoslav Journal of Operations Research Pub Date : 2023-01-01 DOI:10.2298/yjor230315019z
Djamel Zerrouki, Mohand Ouanes
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Abstract

In this paper, we investigate bounds on eigenvalues of real symmetric interval matrices. We present a method that computes bounds on eigenvalues of real symmetric interval matrices. It outperforms many methods developed in the literature and produces as sharp as possible bounds on eigenvalues of real symmetric interval matrices. The aim is to apply the proposed method to compute lower bounds on eigenvalues of a symmetric interval hessian matrix of a nonconvex function in the ?BB method and use them to produce a tighter underestimator that improves the ?BB algorithm for solving global optimization problems. In the end, we illustrate by example, the comparison of various approaches of bounding eigenvalues of real symmetric interval matrices. Moreover, a set of test problems found in the literature are solved efficiently and the performances of the proposed method are compared with those of other methods.
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αBB方法全局寻优实数对称区间矩阵的特征值界
本文研究了实对称区间矩阵的特征值界。给出了一种计算实对称区间矩阵特征值界的方法。它优于文献中开发的许多方法,并在实对称区间矩阵的特征值上产生尽可能清晰的界。目的是应用所提出的方法计算非凸函数的对称区间hessian矩阵的特征值下界,并利用它们产生一个更紧密的低估量,从而改进了求解全局优化问题的BB算法。最后,我们用实例说明了实对称区间矩阵边界特征值的各种方法的比较。此外,有效地解决了文献中发现的一组测试问题,并将该方法的性能与其他方法进行了比较。
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来源期刊
Yugoslav Journal of Operations Research
Yugoslav Journal of Operations Research Decision Sciences-Management Science and Operations Research
CiteScore
2.50
自引率
0.00%
发文量
14
审稿时长
24 weeks
期刊最新文献
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