Long-time asymptotics for the $N_{\infty}$-soliton solution to the KdV equation with two types of generalized reflection coefficients

TL;DR

This paper analyzes the long-time behavior of N-infinity soliton solutions to the KdV equation using Riemann-Hilbert problems with generalized reflection coefficients, employing special functions for local parametrices.

Contribution

It introduces a systematic approach to handle generalized reflection coefficients with singularities and step-like functions in the asymptotic analysis of KdV solitons.

Findings

Extended the understanding of soliton gas asymptotics.

Developed local parametrix constructions with special functions.

Provided detailed asymptotic descriptions in different regions.

Abstract

We systematically investigate the long-time asymptotics for the $N_{\infty}$-soliton solution to the KdV equation in the different regions with the aid of the Riemann-Hilbert (RH) problems with two types of generalized reflection coefficients on the interval $\left[\eta_1, \eta_2\right]\in \mathbb{R}^+$: $r_0(\lambda,\eta_0; \beta_0, \beta_1,\beta_2)=\left(\lambda-\eta_1\right)^{\beta_1}\left(\eta_2-\lambda\right)^{\beta_2}\left|\lambda-\eta_0\right|^{\beta_0}\gamma\left(\lambda\right)$, $r_c(\lambda,\eta_0; \beta_1,\beta_2)=\left(\lambda-\eta_1\right)^{\beta_1}\left(\eta_2-\lambda\right)^{\beta_2}\chi_c\left(\lambda, \eta_0\right)\gamma \left(\lambda\right)$, where the singularity $\eta_0\in (\eta_1, \eta_2)$ and $\beta_j>-1$ ($j=0, 1, 2$), $\gamma: \left[\eta_1, \eta_2\right] \to\mathbb{R}^+$ is continuous and positive on $\left[\eta_1, \eta_2\right]$, with an analytic extension to a neighborhood of this interval, and the step-like function $\chi_c$ is defined as $\chi_c\left(\lambda,\eta_0\right)=1$ for $\lambda\in\left[\eta_1, \eta_0\right)$ and $\chi_c\left(\lambda,\eta_0\right)=c^2$ for $\lambda\in\left(\eta_0, \eta_2\right]$ with $c>0, \, c\ne1$. A critical step in the analysis of RH problems via the Deift-Zhou steepest descent technique is how to construct local parametrices around the endpoints $\eta_j$'s and the singularity $\eta_0$. Specifically, the modified Bessel functions of indexes $\beta_j$'s are utilized for the endpoints $\eta_j$'s, and the modified Bessel functions of index $\left(\beta_0\pm 1\right)\left/\right.2$ and confluent hypergeometric functions are employed around the singularity $\eta_0$ if the reflection coefficients are $r_0$ and $r_c$, respectively. This comprehensive study extends the understanding of generalized reflection coefficients and provides valuable insights into the asymptotics of soliton gases.