On Convergence of Binary Trust-Region Steepest Descent

Journal of Nonsmooth Analysis and Optimization Pub Date : 2022-02-16 DOI:10.46298/jnsao-2023-10164
Paul Manns, Mirko Hahn, C. Kirches, S. Leyffer, S. Sager
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引用次数: 2

Abstract

Binary trust-region steepest descent (BTR) and combinatorial integral approximation (CIA) are two recently investigated approaches for the solution of optimization problems with distributed binary-/discrete-valued variables (control functions). We show improved convergence results for BTR by imposing a compactness assumption that is similar to the convergence theory of CIA. As a corollary we conclude that BTR also constitutes a descent algorithm on the continuous relaxation and its iterates converge weakly-$^*$ to stationary points of the latter. We provide computational results that validate our findings. In addition, we observe a regularizing effect of BTR, which we explore by means of a hybridization of CIA and BTR.
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二元信赖域最陡下降的收敛性
二元信赖域最陡下降法(BTR)和组合积分逼近法(CIA)是近年来研究的两种求解具有分布二元/离散变量(控制函数)的优化问题的方法。我们通过施加一个类似于CIA收敛理论的紧性假设,证明了BTR收敛结果的改进。作为推论,我们得出BTR也构成了连续松弛的下降算法,其迭代弱收敛于后者的平稳点。我们提供了计算结果来验证我们的发现。此外,我们观察到BTR的正则化效应,我们通过CIA和BTR的杂交来探索。
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Journal of Nonsmooth Analysis and Optimization
Journal of Nonsmooth Analysis and Optimization
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