相空间
高斯求积
统计物理学
数值积分
高斯分布
计算机科学
计算
正交(天文学)
蒙特卡罗方法
热力学积分
应用数学
算法
数学
物理
尼氏法
数学分析
能量(信号处理)
积分方程
统计
光学
热力学
量子力学
作者
Shashank Saxena,Jan-Hendrik Bastek,Miguel Spínola,Prateek Gupta,Dennis M. Kochmann
标识
DOI:10.1016/j.mechmat.2023.104681
摘要
Overcoming the time scale limitations of atomistics can be achieved by switching from the state-space representation of Molecular Dynamics (MD) to a statistical-mechanics-based representation in phase space, where approximations such as maximum-entropy or Gaussian phase packets (GPP) evolve the atomistic ensemble in a time-coarsened fashion. In practice, this requires the computation of expensive high-dimensional integrals over all of phase space of an atomistic ensemble. This, in turn, is commonly accomplished efficiently by low-order numerical quadrature. We show that numerical quadrature in this context, unfortunately, comes with a set of inherent problems, which corrupt the accuracy of simulations—especially when dealing with crystal lattices with imperfections. As a remedy, we demonstrate that Graph Neural Networks, trained on Monte-Carlo data, can serve as a replacement for commonly used numerical quadrature rules, overcoming their deficiencies and significantly improving the accuracy. This is showcased by three benchmarks: the thermal expansion of copper, the martensitic phase transition of iron, and the energy of grain boundaries. We illustrate the benefits of the proposed technique over classically used third- and fifth-order Gaussian quadrature, highlight the impact on time-coarsened atomistic predictions, and discuss the computational efficiency. The latter is of general importance when performing frequent evaluation of phase space or other high-dimensional integrals, which is why the proposed framework promises applications beyond the scope of atomistics.
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