Bifurcation of the travelling wave solutions in a perturbed (1 + 1)-dimensional dispersive long wave equation via a geometric approach

Proceedings of the Royal Society of Edinburgh: Section A Mathematics Pub Date : 2024-04-25 DOI:10.1017/prm.2024.45

Hang Zheng, Yonghui Xia

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Abstract

Choosing ${\kappa }$ (horizontal ordinate of the saddle point associated to the homoclinic orbit) as bifurcation parameter, bifurcations of the travelling wave solutions is studied in a perturbed $(1 + 1)$ -dimensional dispersive long wave equation. The solitary wave solution exists at a suitable wave speed $c$ for the bifurcation parameter ${\kappa }\in \left (0,1-\frac {\sqrt 3}{3}\right )\cup \left (1+\frac {\sqrt 3}{3},2\right )$ , while the kink and anti-kink wave solutions exist at a unique wave speed $c^*=\sqrt {15}/3$ for $\kappa =0$ or $\kappa =2$ . The methods are based on the geometric singular perturbation (GSP, for short) approach, Melnikov method and invariant manifolds theory. Interestingly, not only the explicit analytical expression of the complicated homoclinic Melnikov integral is directly obtained for the perturbed long wave equation, but also the explicit analytical expression of the limit wave speed is directly given. Numerical simulations are utilized to verify our mathematical results.

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通过几何方法研究扰动 (1 + 1) 维分散长波方程中的行波解的分岔问题

选择 ${\kappa }$（与同线轨道相关的鞍点的水平序线）作为分岔参数，研究了扰动 $(1 + 1)$ 二维色散长波方程中的行波解的分岔。在分岔参数 ${\kappa }\in \left (0,1-\frac {\sqrt 3}{3}\right )\cup \left (1+\frac {\sqrt 3}{3}、2}right ）$ ，而当 $\kappa =0$ 或 $\kappa =2$ 时，扭结波和反扭结波的解以唯一的波速 $c^*=\sqrt {15}/3$ 存在。这些方法基于几何奇异扰动（简称 GSP）方法、梅尔尼科夫方法和不变流形理论。有趣的是，对于扰动长波方程，不仅直接得到了复杂同次梅利尼科夫积分的显式分析表达，而且直接给出了极限波速的显式分析表达。我们利用数值模拟来验证我们的数学结果。

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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Proceedings of the Royal Society of Edinburgh: Section A Mathematics

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