Black Box Optimization Using QUBO and the Cross Entropy Method

International Conference on Conceptual Structures Pub Date : 2022-06-24 DOI:10.48550/arXiv.2206.12510

Jonas Nusslein, Christoph Roch, Thomas Gabor, Claudia Linnhoff-Popien, Sebastian Feld

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引用次数: 4

Abstract

Black-box optimization (BBO) can be used to optimize functions whose analytic form is unknown. A common approach to realising BBO is to learn a surrogate model which approximates the target black-box function which can then be solved via white-box optimization methods. In this paper, we present our approach BOX-QUBO, where the surrogate model is a QUBO matrix. However, unlike in previous state-of-the-art approaches, this matrix is not trained entirely by regression, but mostly by classification between 'good' and 'bad' solutions. This better accounts for the low capacity of the QUBO matrix, resulting in significantly better solutions overall. We tested our approach against the state-of-the-art on four domains and in all of them BOX-QUBO showed better results. A second contribution of this paper is the idea to also solve white-box problems, i.e. problems which could be directly formulated as QUBO, by means of black-box optimization in order to reduce the size of the QUBOs to the information-theoretic minimum. Experiments show that this significantly improves the results for MAX-k-SAT.

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基于QUBO和交叉熵方法的黑盒优化

黑盒优化(BBO)可以用于对解析形式未知的函数进行优化。实现BBO的一种常用方法是学习一个代理模型，该模型近似于目标黑盒函数，然后可以通过白盒优化方法求解。在本文中，我们提出了BOX-QUBO方法，其中代理模型是一个QUBO矩阵。然而，与之前最先进的方法不同，这个矩阵并不完全通过回归来训练，而是主要通过“好”和“坏”解决方案之间的分类来训练。这更好地解释了QUBO矩阵的低容量，从而产生总体上更好的解决方案。我们在四个领域对我们的方法进行了最先进的测试，BOX-QUBO在所有这些领域都表现出更好的结果。本文的第二个贡献是解决白盒问题的想法，即可以直接表述为QUBO的问题，通过黑盒优化将QUBO的大小减小到信息论的最小值。实验表明，这大大改善了MAX-k-SAT的结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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International Conference on Conceptual Structures

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