多色孤子气体的黎曼问题:光谱动力学理论的试验台

T. Congy, H. T. Carr, G. Roberti, G. A. El
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引用次数: 0

摘要

我们以孤子气体的黎曼问题为基准,对Korteweg-de Vries(KdV)和聚焦非线性薛定谔(fNLS)方程的光谱动力学理论进行了详细的数值验证。我们构建了孤子气体动力学方程的弱解,该方程描述了由有限数量的 "单色 "成分组成的两个致密 "多色 "孤子气体的碰撞,每个成分都由拉克斯对中散射算子的谱参数几乎完全相同的孤子组成。气体成分之间的相互作用在大尺度流体动力演化中起着关键作用。然后,我们利用谱动力学方程的解来评估 KdV 和 fNLS 孤子气体中的宏观物理观测值,并将它们与从 KdV 和 fNLS 方程的 "精确 "孤子气体数值解中提取的各自集合平均值进行比较。为了在数值上合成致密多色孤子气体,我们开发了一种新方法,该方法结合了所谓孤子凝聚体光谱理论的最新进展,以及在数值上实现 $n$ 大 $n$ 孤子解的有效算法。
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Riemann problem for polychromatic soliton gases: a testbed for the spectral kinetic theory
We use Riemann problem for soliton gas as a benchmark for a detailed numerical validation of the spectral kinetic theory for the Korteweg-de Vries (KdV) and the focusing nonlinear Schr\"odinger (fNLS) equations. We construct weak solutions to the kinetic equation for soliton gas describing collision of two dense "polychromatic" soliton gases composed of a finite number of "monochromatic" components, each consisting of solitons with nearly identical spectral parameters of the scattering operator in the Lax pair. The interaction between the gas components plays the key role in the emergent, large-scale hydrodynamic evolution. We then use the solutions of the spectral kinetic equation to evaluate macroscopic physical observables in KdV and fNLS soliton gases and compare them with the respective ensemble averages extracted from the "exact" soliton gas numerical solutions of the KdV and fNLS equations. To numerically synthesise dense polychromatic soliton gases we develop a new method which combines recent advances in the spectral theory of the so-called soliton condensates and the effective algorithms for the numerical realisation of $n$-soliton solutions with large $n$.
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