Sequential Construction and Dimension Reduction of Gaussian Processes Under Inequality Constraints

IF 1.9 Q1 MATHEMATICS, APPLIED SIAM journal on mathematics of data science Pub Date : 2020-09-09 DOI:10.1137/21m1407513
F. Bachoc, A. F. López-Lopera, O. Roustant
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引用次数: 2

Abstract

Accounting for inequality constraints, such as boundedness, monotonicity or convexity, is challenging when modeling costly-to-evaluate black box functions. In this regard, finite-dimensional Gaussian process (GP) models bring a valuable solution, as they guarantee that the inequality constraints are satisfied everywhere. Nevertheless, these models are currently restricted to small dimensional situations (up to dimension 5). Addressing this issue, we introduce the MaxMod algorithm that sequentially inserts one-dimensional knots or adds active variables, thereby performing at the same time dimension reduction and efficient knot allocation. We prove the convergence of this algorithm. In intermediary steps of the proof, we propose the notion of multi-affine extension and study its properties. We also prove the convergence of finite-dimensional GPs, when the knots are not dense in the input space, extending the recent literature. With simulated and real data, we demonstrate that the MaxMod algorithm remains efficient in higher dimension (at least in dimension 20), and has a smaller computational complexity than other constrained GP models from the state-of-the-art, to reach a given approximation error.
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不等式约束下高斯过程的序列构造与降维
当对代价高昂的黑盒函数进行建模以评估时,考虑不等式约束,如有界性、单调性或凸性,是具有挑战性的。在这方面,有限维高斯过程(GP)模型带来了一个有价值的解决方案,因为它们保证了处处满足不等式约束。尽管如此,这些模型目前仅限于小维情况(高达5维)。为了解决这个问题,我们引入了MaxMod算法,该算法顺序插入一维结或添加活动变量,从而同时执行降维和有效的结分配。我们证明了该算法的收敛性。在证明的中间步骤中,我们提出了多重仿射扩张的概念,并研究了它的性质。我们还证明了当节点在输入空间中不稠密时,有限维GP的收敛性,扩展了最近的文献。通过模拟和真实数据,我们证明了MaxMod算法在更高维度(至少在维度20)上仍然有效,并且与现有技术中的其他约束GP模型相比,具有更小的计算复杂度,以达到给定的近似误差。
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