Application of Kolmogorov-Arnold Network (KAN) for Solitary-Peakon Investigation of Lax Model

IF 6.4 2区工程技术 Q1 THERMODYNAMICS

Case Studies in Thermal Engineering Pub Date : 2025-06-20 DOI:10.1016/j.csite.2025.106537

Muhammad Wajahat Anjum, Sana Ullah Saqib, Yin-Tzer Shih, Israr Ul Hassan, Adnan, Ines Hilali Jaghdam, Mouloud Aoudia, Lioua Kolsi

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引用次数: 0

Abstract

This study utilizes novel Kolmogorov-Arnold Networks to solve the fifth-order KdV-Lax problem, employing both periodic and Peakon solutions. Several soliton solutions, including solitary wave, Peakon forms, are presented using the KANs technique for the Lax problem of fifth order. The novelty of this investigation lies in its combination of a practical numerical approach for KANs with a powerful analytical strategy (the exp-function method) to verify reliability and authenticity, utilizing illustrations and tables to identify various types of soliton solutions. Although KANs provide an approximation for solving the KdV-Lax equation, their ability to tackle complex problems makes them a viable choice when an analytical solution is not possible. The use of KANs over the exponential function method's approximate solution is exceptional; it offers a thorough analysis of the solution's uniqueness and convergence using loss plots, error histograms, mean square logarithmic error, mean poisson deviation, and regression plots, among others. The numerical results of thorough simulations, with minimal error (), regression metric value (), and histogram with the majority of instances () nearly close to zero, unquestionably supported or confirmed the accuracy of KANs against the analytical (exp-function) method. Furthermore, the robustness of the KANs model is demonstrated by consistently low absolute error metrics.

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Kolmogorov-Arnold网络（KAN）在Lax模型的孤-峰调查中的应用

本文利用新颖的Kolmogorov-Arnold网络求解五阶KdV-Lax问题，同时采用周期解和Peakon解。利用KANs技术，给出了五阶Lax问题的几个孤子解，包括孤波，Peakon形式。这项研究的新颖之处在于它结合了实用的数值方法和强大的分析策略（exp-function方法）来验证可靠性和真实性，利用插图和表格来识别各种类型的孤子解。尽管KANs提供了求解KdV-Lax方程的近似方法，但它们处理复杂问题的能力使它们在无法进行解析解决时成为可行的选择。在指数函数方法的近似解上使用KANs是例外；它使用损失图、误差直方图、均方对数误差、平均泊松偏差和回归图等对解决方案的唯一性和收敛性进行了全面的分析。彻底模拟的数值结果，误差最小（），回归度量值（），直方图，大多数实例（）几乎接近于零，毫无疑问地支持或证实了KANs相对于解析（exp-function）方法的准确性。此外，KANs模型的鲁棒性证明了一贯的低绝对误差指标。

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

Case Studies in Thermal Engineering Chemical Engineering-Fluid Flow and Transfer Processes

CiteScore

8.60

自引率

11.80%

发文量

812

审稿时长

76 days

期刊介绍： Case Studies in Thermal Engineering provides a forum for the rapid publication of short, structured Case Studies in Thermal Engineering and related Short Communications. It provides an essential compendium of case studies for researchers and practitioners in the field of thermal engineering and others who are interested in aspects of thermal engineering cases that could affect other engineering processes. The journal not only publishes new and novel case studies, but also provides a forum for the publication of high quality descriptions of classic thermal engineering problems. The scope of the journal includes case studies of thermal engineering problems in components, devices and systems using existing experimental and numerical techniques in the areas of mechanical, aerospace, chemical, medical, thermal management for electronics, heat exchangers, regeneration, solar thermal energy, thermal storage, building energy conservation, and power generation. Case studies of thermal problems in other areas will also be considered.