Two-dimensional stationary soliton gas

arXiv - PHYS - Pattern Formation and Solitons Pub Date : 2024-08-10 DOI:arxiv-2408.05548

Thibault Bonnemain, Benjamin Doyon, Gino Biondini, Giacomo Roberti, Gennady A. El

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Abstract

We study two-dimensional stationary soliton gas in the framework of the time-independent reduction of the Kadomtsev-Petviashvili (KPII) equation, which coincides with the integrable two-way ``good'' Boussinesq equation in the xy-plane. This (2+0)D reduction enables the construction of the kinetic equation for the stationary gas of KP solitons by invoking recent results on (1+1)D bidirectional soliton gases and generalised hydrodynamics of the Boussinesq equation. We then use the kinetic theory to analytically describe two basic types of 2D soliton gas interactions: (i) refraction of a line soliton by a stationary soliton gas, and (ii) oblique interference of two soliton gases. We verify the analytical predictions by numerically implementing the corresponding KPII soliton gases via exact N-soliton solutions with N-large and appropriately chosen random distributions for the soliton parameters. We also explicitly evaluate the long-distance correlations for the two-component interference configurations. The results can be applied to a variety of physical systems, from shallow water waves to Bose-Einstein condensates.

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二维静止孤子气体

我们在Kadomtsev-Petviashvili（KPII）方程与时间无关的还原框架下研究二维静止孤子气，KPII方程与xy平面上可积分的双向 "好 "布辛斯方程相吻合。这种 (2+0)D 的还原使得我们能够通过引用最近关于 (1+1)D 双向孤子气体和布西尼斯克方程广义流体力学的结果，构建 KP 孤子静止气体的动力学方程。然后，我们利用动力学理论分析描述了二维孤子气体相互作用的两种基本类型：(i) 线孤子对静止孤子气体的折射，以及 (ii) 双孤子气体的斜干涉。我们通过精确的 N 个孤子解，并适当选择 N 个大孤子参数的随机分布，在数值上实现了相应的 KPII 孤子气体，从而验证了分析预测。我们还明确评估了双分量干涉配置的长距离相关性。这些结果可应用于从浅水波到玻色-爱因斯坦凝聚态等各种物理系统。

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arXiv - PHYS - Pattern Formation and Solitons

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