ON THE SEMI-DOMAIN SOLITON SOLUTIONS FOR THE FRACTAL (3+1)-DIMENSIONAL GENERALIZED KADOMTSEV–PETVIASHVILI– BOUSSINESQ EQUATION

Fractals Pub Date : 2024-01-23 DOI:10.1142/s0218348x24500245
Kang-Jia Wang, JING-HUA Liu, Feng Shi
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Abstract

The aim of this study is to explore some semi-domain soliton solutions for the fractal (3+1)-dimensional generalized Kadomtsev–Petviashvili–Boussinesq equation (GKPBe) within He’s fractal derivative. First, the fractal soliton molecules are plumbed by combining the Hirota equation and fractal two-scale transform. Second, the Bernoulli sub-equation function approach together with the fractal two-scale transform is employed to investigate the other soliton solutions, which include the kink soliton and the rough wave soliton solutions. The impact of the different fractal orders on the physical behaviors of the semi-domain soliton solutions is also discussed graphically. The methods mentioned in this research are expected to provide some new viewpoints on the behaviors of the fractal PDEs.
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关于分形(3+1)维广义卡多姆采夫-彼得维亚什维利-布西内斯克方程的半域孤子解
本研究旨在探索 He 分形导数内分形 (3+1) 维广义卡多姆采夫-彼得维亚什维利-布西尼斯克方程 (GKPBe) 的一些半域孤子解。首先,通过结合 Hirota 方程和分形双尺度变换,研究了分形孤子分子。其次,利用伯努利子方程函数方法和分形双尺度变换研究了其他孤子解,包括扭结孤子解和粗糙波孤子解。研究还以图形方式讨论了不同分形阶数对半域孤子解物理行为的影响。本研究中提到的方法有望为分形 PDEs 的行为提供一些新观点。
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