At present, high-dimensional global optimization problems with time-series models have received much attention from engineering fields. Since it was proposed, Bayesian optimization has quickly become a popular and promising approach for solving global optimization problems. However, the standard Bayesian optimization algorithm is insufficient to solving the global optimal solution when the model is high-dimensional. Hence, this paper presents a novel high dimensional Bayesian optimization algorithm by considering dimension reduction and different dimension fill-in strategies. Most existing literature about Bayesian optimization algorithms did not discuss the sampling strategies to optimize the acquisition function. This study proposed a new sampling method based on both the multi-armed bandit and random search methods while optimizing the acquisition function. Besides, based on the time-dependent or dimension-dependent characteristics of the model, the proposed algorithm can reduce the dimension evenly. Then, five different dimension fill-in strategies were discussed and compared in this study. Finally, to increase the final accuracy of the optimal solution, the proposed algorithm adds a local search based on a series of Adam-based steps at the final stage. Our computational experiments demonstrated that the proposed Bayesian optimization algorithm could achieve reasonable solutions with excellent performances for high dimensional global optimization problems with a time-series optimal control model.
翻译:目前,与时序模型有关的高维全球优化问题从工程领域受到了很多关注。自提出以来,巴耶斯优化迅速成为解决全球优化问题的一种流行和有希望的方法。然而,标准的巴耶斯优化算法不足以在模型具有高维时解决全球最佳解决方案。因此,本文件通过考虑尺寸减少和不同维度填充战略,提出了一种新的高维拜伊斯优化算法。关于巴耶斯优化算法的现有大部分文献没有讨论优化获取功能的抽样战略。本研究提出了一种基于多臂强盗和随机搜索方法的新抽样方法,同时优化获取功能。此外,基于模型的时间依赖或层面依赖的特点,拟议的巴伊斯优化算法可以均衡地减少这一层面。随后,本研究讨论了五个不同的维度填充战略并进行了比较。最后,为了提高最佳解决方案的最终准确性,拟议的算法增加了基于最后阶段亚当系列步骤的本地搜索。我们的计算实验表明,拟议的巴伊西亚优化算法模型可以实现合理的解决方案,并具有高度全球优化的时序控制。