通过条件扩散模型和神经运算器建立数据驱动的随机闭合模型

Xinghao Dong, Chuanqi Chen, Jin-Long Wu
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引用次数: 0

摘要

闭合模型广泛应用于模拟复杂的多尺度动力学系统,如湍流和地球系统。对于那些没有明确尺度划分的系统,确定性模型和局部闭合模型往往缺乏足够的泛化能力,这限制了它们在许多现实世界应用中的性能。在这项工作中,我们提出了一个数据驱动的建模框架,利用条件扩散模型和神经算子构建随机和非局部封闭模型。具体来说,我们将傅立叶神经算子纳入了基于分数的扩散模型,该模型可作为数据驱动的随机闭合模型,用于由偏微分方程(PDE)控制的复杂动态系统。我们还演示了加速采样方法如何提高数据驱动随机闭合模型的效率。结果表明,所提出的方法通过生成式机器学习技术提供了一种系统方法,可为具有连续时空场的多尺度动态系统构建数据驱动随机闭合模型。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Data-Driven Stochastic Closure Modeling via Conditional Diffusion Model and Neural Operator
Closure models are widely used in simulating complex multiscale dynamical systems such as turbulence and the earth system, for which direct numerical simulation that resolves all scales is often too expensive. For those systems without a clear scale separation, deterministic and local closure models often lack enough generalization capability, which limits their performance in many real-world applications. In this work, we propose a data-driven modeling framework for constructing stochastic and non-local closure models via conditional diffusion model and neural operator. Specifically, the Fourier neural operator is incorporated into a score-based diffusion model, which serves as a data-driven stochastic closure model for complex dynamical systems governed by partial differential equations (PDEs). We also demonstrate how accelerated sampling methods can improve the efficiency of the data-driven stochastic closure model. The results show that the proposed methodology provides a systematic approach via generative machine learning techniques to construct data-driven stochastic closure models for multiscale dynamical systems with continuous spatiotemporal fields.
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