使用随机特征的运算器学习:科学计算工具

IF 10.8 1区 数学 Q1 MATHEMATICS, APPLIED SIAM Review Pub Date : 2024-08-08 DOI:10.1137/24m1648703
Nicholas H. Nelsen, Andrew M. Stuart
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引用次数: 0

摘要

SIAM Review》,第 66 卷第 3 期,第 535-571 页,2024 年 5 月。 监督算子学习的核心是使用输入输出对形式的训练数据来估计无限维空间之间的映射。它正在成为补充传统科学计算的强大工具,而传统科学计算通常是以函数空间之间的算子映射为框架的。本文以用于标量回归的经典随机特征方法为基础,介绍了函数值随机特征方法。这就产生了一种有监督的算子学习架构,它适用于非线性问题,而且结构合理,便于通过优化凸二次成本进行高效训练。由于采用了二次方结构,训练后的模型具有收敛性保证以及误差和复杂性约束,而这些特性是大多数其他算子学习架构所不具备的。该方法的核心是建立随机算子的线性组合。事实证明,这是一种算子值核脊回归算法的低阶近似,因此该方法与高斯过程回归也有密切联系。论文根据参数偏微分方程产生的两个非线性算子学习基准问题的结构,设计了函数值随机特征。数值结果证明了函数值随机特征方法的可扩展性、离散不变性和可移植性。
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Operator Learning Using Random Features: A Tool for Scientific Computing
SIAM Review, Volume 66, Issue 3, Page 535-571, May 2024.
Supervised operator learning centers on the use of training data, in the form of input-output pairs, to estimate maps between infinite-dimensional spaces. It is emerging as a powerful tool to complement traditional scientific computing, which may often be framed in terms of operators mapping between spaces of functions. Building on the classical random features methodology for scalar regression, this paper introduces the function-valued random features method. This leads to a supervised operator learning architecture that is practical for nonlinear problems yet is structured enough to facilitate efficient training through the optimization of a convex, quadratic cost. Due to the quadratic structure, the trained model is equipped with convergence guarantees and error and complexity bounds, properties that are not readily available for most other operator learning architectures. At its core, the proposed approach builds a linear combination of random operators. This turns out to be a low-rank approximation of an operator-valued kernel ridge regression algorithm, and hence the method also has strong connections to Gaussian process regression. The paper designs function-valued random features that are tailored to the structure of two nonlinear operator learning benchmark problems arising from parametric partial differential equations. Numerical results demonstrate the scalability, discretization invariance, and transferability of the function-valued random features method.
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来源期刊
SIAM Review
SIAM Review 数学-应用数学
CiteScore
16.90
自引率
0.00%
发文量
50
期刊介绍: Survey and Review feature papers that provide an integrative and current viewpoint on important topics in applied or computational mathematics and scientific computing. These papers aim to offer a comprehensive perspective on the subject matter. Research Spotlights publish concise research papers in applied and computational mathematics that are of interest to a wide range of readers in SIAM Review. The papers in this section present innovative ideas that are clearly explained and motivated. They stand out from regular publications in specific SIAM journals due to their accessibility and potential for widespread and long-lasting influence.
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