Insights into the time Fractional Belousov-Zhabotinsky System Arises in Thermodynamics

IF 1.3 4区 物理与天体物理 Q3 PHYSICS, MULTIDISCIPLINARY International Journal of Theoretical Physics Pub Date : 2024-09-03 DOI:10.1007/s10773-024-05770-0
M. L. Rupa, K. Aruna, K. Raghavendar
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Abstract

This article employs the Shehu Adomian decomposition method to derive approximate solutions for the time-fractional Belousov-Zhabotinsky system, a phenomenon prevalent in the field of thermodynamics. This model offers a deep understanding of the core principles of nonlinear dynamics in intricate systems. This model is additionally employed to investigate bifurcations, chaotic dynamics, and other nonlinear phenomena in chemical processes. The advantage of the suggested method is that, unlike the usual Adomian process, it doesn’t involve figuring out the fractional derivative or integrals in the recursive mechanism. This makes it simple to evaluate series terms. We present Caputo, Caputo-Fabrizio, and Atangana-Baleanu in the Caputo sense fractional derivatives with the proposed method to enhance the comprehension of this intricate mechanism. We have presented various 2D and 3D graphical visualizations of the obtained solutions to demonstrate the model behaviour and the effects of the derived results by varying the fractional order. The obtained results are highly consistent with the q-homotopy analysis transform method, the fractional reduced differential transform method, and the double Laplace transform method. We also present the convergence and uniqueness of the proposed system. The results obtained with the proposed method indicate that it is simple to implement and computationally very attractive.

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洞察热力学中出现的时间分数别洛乌索夫-扎博金斯基系统
本文采用 Shehu Adomian 分解法推导出时间分数贝洛索夫-扎博金斯基系统的近似解,这是热力学领域的一种普遍现象。该模型有助于深入理解复杂系统中非线性动力学的核心原理。此外,该模型还可用于研究化学过程中的分岔、混沌动力学和其他非线性现象。所建议方法的优势在于,与通常的 Adomian 过程不同,它不涉及计算递归机制中的分数导数或积分。这使得评估序列项变得简单。我们将 Caputo、Caputo-Fabrizio 和 Atangana-Baleanu 在 Caputo 意义上的分数导数与所提出的方法结合起来,以加深对这一复杂机制的理解。我们展示了所获得解的各种二维和三维可视化图形,以展示模型行为以及通过改变分数阶数得出的结果的影响。得到的结果与 q-同调分析变换方法、分数还原微分变换方法和双拉普拉斯变换方法高度一致。我们还介绍了所提系统的收敛性和唯一性。利用所提方法得到的结果表明,该方法易于实现,而且在计算上非常有吸引力。
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来源期刊
CiteScore
2.50
自引率
21.40%
发文量
258
审稿时长
3.3 months
期刊介绍: International Journal of Theoretical Physics publishes original research and reviews in theoretical physics and neighboring fields. Dedicated to the unification of the latest physics research, this journal seeks to map the direction of future research by original work in traditional physics like general relativity, quantum theory with relativistic quantum field theory,as used in particle physics, and by fresh inquiry into quantum measurement theory, and other similarly fundamental areas, e.g. quantum geometry and quantum logic, etc.
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