Miura transformations and large-time behaviors of the Hirota-Satsuma equation

arXiv - PHYS - Exactly Solvable and Integrable Systems Pub Date : 2024-04-01 DOI:arxiv-2404.01215

Deng-Shan Wang, Cheng Zhu, Xiaodong Zhu

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Abstract

The good Boussinesq equation has several modified versions such as the modified Boussinesq equation, Mikhailov-Lenells equation and Hirota-Satsuma equation. This work builds the full relations among these equations by Miura transformation and invertible linear transformations and draws a pyramid diagram to demonstrate such relations. The direct and inverse spectral analysis shows that the solution of Riemann-Hilbert problem for Hirota-Satsuma equation has simple pole at origin, the solution of Riemann-Hilbert problem for the good Boussinesq equation has double pole at origin, while the solution of Riemann-Hilbert problem for the modified Boussinesq equation and Mikhailov-Lenells equation doesn't have singularity at origin. Further, the large-time asymptotic behaviors of the Hirota-Satsuma equation with Schwartz class initial value is studied by Deift-Zhou nonlinear steepest descent analysis. In such initial condition, the asymptotic expressions of the Hirota-Satsuma equation and good Boussinesq equation away from the origin are proposed and it is displayed that the leading term of asymptotic formulas match well with direct numerical simulations.

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广田-萨摩方程的三浦变换和大时间行为

优秀的布西内斯克方程有多个修正版本，如修正布西内斯克方程、米哈伊洛夫-列奈尔斯方程和广田-萨苏马方程。本研究通过米乌拉变换和可逆线性变换建立了这些方程之间的完整关系，并绘制了金字塔图来展示这些关系。直接和逆谱分析表明，Hirota-Satsuma 方程的黎曼-希尔伯特问题解在原点有单极，良好布辛斯方程的黎曼-希尔伯特问题解在原点有双极，而修正布辛斯方程和米哈伊洛夫-列奈尔斯方程的黎曼-希尔伯特问题解在原点没有奇点。此外，Deift-Zhou 非线性最陡下降分析研究了具有 Schwartzclass 初始值的 Hirota-Satsuma 方程的大时间渐近行为。在这样的初始条件下，提出了广田-萨摩方程和良好的布森斯方程远离原点的渐近表达式，结果表明渐近公式的前导项与直接数值模拟非常吻合。

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arXiv - PHYS - Exactly Solvable and Integrable Systems

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