用于非连续流问题数值逼近的埃诺分类和回归神经网络

IF 3.1 3区 计算机科学 Q2 COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE
Vikas Kumar Jayswal, Prashant Kumar Pandey, Ritesh Kumar Dubey
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引用次数: 0

摘要

高阶非振荡多项式近似程序是偏微分方程高阶数值解法的基础,学习这些程序具有挑战性。主要的问题是将这些程序作为一个学习问题,并生成合适的合成数据集,以便用小型神经网络学习这些程序。在这项工作中,我们将基于弧长的本质非振荡(ENOL)重构算法作为机器学习问题。我们给出了一种使用 ENOL 算法以及基本平滑和片断连续函数构建合成数据的新方法。通过训练小香草回归和分类神经网络来学习三阶(ENOL)多项式近似程序。介绍并评论了经过训练的 ENO 分类和回归网络的度量。这些训练有素的模型在数值求解器中实施,以计算双曲守恒定律测试问题的解决方案。给出的数值结果表明,ENO 分类网络给出的结果与精确的 ENOL 重建结果相当,而 ENO 回归网络在收敛性和解决不连续性方面表现不佳。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Eno classification and regression neural networks for numerical approximation of discontinuous flow problems

Eno classification and regression neural networks for numerical approximation of discontinuous flow problems

Learning high order non-oscillatory polynomial approximation procedures which form the backbone of high order numerical solution of partial differential equations is challenging. The major issue is to pose these procedures as a learning problem and generate suitable synthetic data set which suffice learning it with small neural networks. In this work, we pose an arc-length based essentially non-oscillatory (ENOL) reconstruction algorithm as machine learning problem. A novel way to construct the synthetic data using ENOL algorithm along with basic smooth and piece-wise continuous functions is given. Small vanilla regression and classification neural networks are trained to learn third order (ENOL) polynomial approximation procedure. The metric of trained ENO classification and regression networks is presented and commented. These trained models are implemented in numerical solver to compute the solution of test problems of hyperbolic conservation laws. The presented numerical results show that ENO classification network gives results comparable to the exact ENOL reconstruction whereas ENO regression network performs poorly both in terms of convergence and resolving the discontinuities.

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来源期刊
Soft Computing
Soft Computing 工程技术-计算机:跨学科应用
CiteScore
8.10
自引率
9.80%
发文量
927
审稿时长
7.3 months
期刊介绍: Soft Computing is dedicated to system solutions based on soft computing techniques. It provides rapid dissemination of important results in soft computing technologies, a fusion of research in evolutionary algorithms and genetic programming, neural science and neural net systems, fuzzy set theory and fuzzy systems, and chaos theory and chaotic systems. Soft Computing encourages the integration of soft computing techniques and tools into both everyday and advanced applications. By linking the ideas and techniques of soft computing with other disciplines, the journal serves as a unifying platform that fosters comparisons, extensions, and new applications. As a result, the journal is an international forum for all scientists and engineers engaged in research and development in this fast growing field.
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