神经分式微分方程

IF 4.4 2区工程技术 Q1 ENGINEERING, MULTIDISCIPLINARY Applied Mathematical Modelling Pub Date : 2025-08-01 Epub Date: 2025-03-06 DOI:10.1016/j.apm.2025.116060

C. Coelho , M. Fernanda P. Costa , L.L. Ferrás

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引用次数: 0

摘要

分数阶微分方程（FDEs）是科学和工程中复杂系统建模的重要工具。他们将传统的微分和积分概念扩展到非整数阶，从而能够更精确地表示以非局部和记忆依赖行为为特征的过程。这个属性在变量不立即响应变化，而是表现出对过去交互的强烈记忆的系统中很有用。考虑到这一点，并从神经常微分方程（Neural ode）中汲取灵感，我们提出了神经FDE，这是一种新颖的深度神经网络框架，可以根据数据的动态调整FDE。这项工作提供了神经FDE和神经FDE体系结构中采用的数值方法的全面概述。数值结果表明，尽管计算要求更高，但神经FDE在具有记忆或依赖于过去状态的系统建模方面可能优于神经ODE，并且它可以有效地应用于学习更复杂的动态系统。

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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Neural fractional differential equations

Fractional Differential Equations (FDEs) are essential tools for modelling complex systems in science and engineering. They extend the traditional concepts of differentiation and integration to non-integer orders, enabling a more precise representation of processes characterised by non-local and memory-dependent behaviours. This property is useful in systems where variables do not respond to changes instantaneously, but instead exhibit a strong memory of past interactions. Having this in mind, and drawing inspiration from Neural Ordinary Differential Equations (Neural ODEs), we propose the Neural FDE, a novel deep neural network framework that adjusts a FDE to the dynamics of data. This work provides a comprehensive overview of the numerical method employed in Neural FDEs and the Neural FDE architecture. The numerical outcomes suggest that, despite being more computationally demanding, the Neural FDE may outperform the Neural ODE in modelling systems with memory or dependencies on past states, and it can effectively be applied to learn more complex dynamical systems.

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来源期刊

Applied Mathematical Modelling 数学-工程：综合

CiteScore

9.80

自引率

8.00%

发文量

508

审稿时长

43 days

期刊介绍： Applied Mathematical Modelling focuses on research related to the mathematical modelling of engineering and environmental processes, manufacturing, and industrial systems. A significant emerging area of research activity involves multiphysics processes, and contributions in this area are particularly encouraged. This influential publication covers a wide spectrum of subjects including heat transfer, fluid mechanics, CFD, and transport phenomena; solid mechanics and mechanics of metals; electromagnets and MHD; reliability modelling and system optimization; finite volume, finite element, and boundary element procedures; modelling of inventory, industrial, manufacturing and logistics systems for viable decision making; civil engineering systems and structures; mineral and energy resources; relevant software engineering issues associated with CAD and CAE; and materials and metallurgical engineering. Applied Mathematical Modelling is primarily interested in papers developing increased insights into real-world problems through novel mathematical modelling, novel applications or a combination of these. Papers employing existing numerical techniques must demonstrate sufficient novelty in the solution of practical problems. Papers on fuzzy logic in decision-making or purely financial mathematics are normally not considered. Research on fractional differential equations, bifurcation, and numerical methods needs to include practical examples. Population dynamics must solve realistic scenarios. Papers in the area of logistics and business modelling should demonstrate meaningful managerial insight. Submissions with no real-world application will not be considered.