TDOR-MPINNs: Multi-output physics-informed neural networks based on time differential order reduction for solving coupled Klein–Gordon–Zakharov systems

IF 1.4 Q2 MATHEMATICS, APPLIED
Jiahuan He, Yang Liu, Hong Li
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引用次数: 0

Abstract

With the continuous development in the field of deep learning, in recent years, it has also been widely used in the field of solving partial differential equations, especially the physics-informed neural networks (PINNs) method. However, the PINNs method has some limitations in solving coupled Klein–Gordon–Zakharov (KGZ) systems. To this end, in this article, inspired by the PINNs method and combined with the characteristics of the coupled KGZ systems, we design a neural network model, named multi-output physics-informed neural networks based on time differential order reduction (TDOR-MPINNs), to solve the coupled KGZ systems. Compared with the PINNs, the TDOR-MPINNs first reduces the time derivatives, and thus can increase supervised learning tasks. And through comparing the numerical results obtained by using TDOR-MPINNs and PINNs for solving the one-dimensional (1-D) and two-dimensional (2-D) coupled KGZ systems, we further validate the effectiveness, accuracy and reliability of the TDOR-MPINNs.

TDOR-MPINNs:基于时差阶减的多输出物理信息神经网络,用于求解耦合克莱因-戈登-扎哈罗夫系统
随着深度学习领域的不断发展,近年来,它也被广泛应用于偏微分方程求解领域,尤其是物理信息神经网络(PINNs)方法。然而,PINNs 方法在求解耦合克莱因-戈登-扎哈罗夫(KGZ)系统时存在一定的局限性。为此,本文受 PINNs 方法的启发,结合耦合 KGZ 系统的特点,设计了一种神经网络模型,命名为基于时差阶减的多输出物理信息神经网络(TDOR-MPINNs),用于求解耦合 KGZ 系统。与 PINNs 相比,TDOR-MPINNs 首先减少了时间导数,从而可以增加监督学习任务。通过比较使用 TDOR-MPINNs 和 PINNs 求解一维(1-D)和二维(2-D)耦合 KGZ 系统的数值结果,我们进一步验证了 TDOR-MPINNs 的有效性、准确性和可靠性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Results in Applied Mathematics
Results in Applied Mathematics Mathematics-Applied Mathematics
CiteScore
3.20
自引率
10.00%
发文量
50
审稿时长
23 days
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