Dynamical behavior of soliton solutions to the fractional phi-four model via two analytical techniques

IF 1.8 4区 物理与天体物理 Q3 PHYSICS, APPLIED
Jamshad Ahmad, Tayyaba Younas
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Abstract

This study explores solutions for a mathematical equation called the time-space fractional phi-four equation using two methods: the Sardar-subequation method and the modified extended auxiliary equation method. The phi-four equation is connected to the Klein–Gordon model and is important in different scientific areas like biology and nuclear physics. Understanding its solutions is crucial. By using a specific wave transformation, the equation is changed into a simpler form for analysis. The methods proposed give a variety of solutions, such as Kink, bright singular, dark, combo dark bright, periodic, and singular periodic solutions. Each solution we find using these methods has specific rules that determine when it’s correct. We carefully choose specific values for the parameters to help us understand more about the solutions. This helps us see the detailed features of the solutions and improves our understanding of how the model behaves in the real world. These methods create a strong framework for studying solitons, which are specific types of mathematical solutions. The study compares the outcomes of these methods with earlier ones to get a complete understanding. Graphical illustrations are used to visually represent some of these solutions, helping us grasp their characteristics. Visual representations in two- and three-dimensional figures add originality to the findings. Importantly, these methods can be applied to solve similar problems with fractional derivatives in various scientific contexts. In summary, this research not only deepens our understanding of the phi-four equation but also introduces powerful methods with broad applications in fractional differential equations.

通过两种分析技术研究分数披四模型孤子解的动力学行为
本研究采用两种方法探索时空分数π-4方程的解法:萨达尔-立方方程法和改进的扩展辅助方程法。π-4方程与克莱因-戈登模型有关,在生物学和核物理等不同科学领域都很重要。了解它的解法至关重要。通过使用特定的波变换,可以将方程转换成更简单的形式进行分析。所提出的方法给出了各种解,如 Kink 解、亮奇异解、暗解、组合暗亮解、周期解和奇周期解。我们使用这些方法找到的每种解都有特定的规则来确定何时正确。我们仔细选择参数的特定值,以帮助我们更好地理解解。这有助于我们看到解的细节特征,并提高我们对模型在现实世界中行为的理解。这些方法为研究孤子(一种特殊类型的数学解)创建了一个强大的框架。这项研究将这些方法的成果与之前的方法进行了比较,以获得全面的理解。图形图解用于直观地表示其中一些解,帮助我们掌握它们的特征。二维和三维图形的直观表示为研究结果增添了新意。重要的是,这些方法可用于解决各种科学背景下类似的分数导数问题。总之,这项研究不仅加深了我们对 phi-four 方程的理解,还介绍了在分数微分方程中广泛应用的强大方法。
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
Modern Physics Letters B
Modern Physics Letters B 物理-物理:凝聚态物理
CiteScore
3.70
自引率
10.50%
发文量
235
审稿时长
5.9 months
期刊介绍: MPLB opens a channel for the fast circulation of important and useful research findings in Condensed Matter Physics, Statistical Physics, as well as Atomic, Molecular and Optical Physics. A strong emphasis is placed on topics of current interest, such as cold atoms and molecules, new topological materials and phases, and novel low-dimensional materials. The journal also contains a Brief Reviews section with the purpose of publishing short reports on the latest experimental findings and urgent new theoretical developments.
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