On the singular nature of shallow-water convergence of the intermediate long wave equation on the real line

TL;DR

This paper analyzes the regularity properties of the solution map for the intermediate long wave (ILW) equation on the real line, revealing a singularity in shallow-water convergence and showing that low frequency dynamics converge to KdV with increased regularity.

Contribution

It demonstrates that the solution map for the low frequency part of ILW is analytic in $L^2$, while the residual part's map is not $C^2$, explaining the regularity gain in shallow-water limits.

Findings

Low frequency solution map is analytic in $L^2$ for small depth.

Residual part of the solution map fails to be $C^2$.

Low frequency dynamics converge to KdV in $L^2$.

Abstract

We investigate regularity properties of the solution map for the intermediate long wave equation (ILW) on the real line. More precisely, we study the scaled ILW which was shown to converge to the Korteweg-de Vries equation (KdV) in $L^2(\mathbb R)$ in the shallow-water limit in a recent work by the first, third, and fourth authors with T. Zhao (2025). By decomposing the dynamics into the low frequency part and the residual part, we show that, when the depth parameter is sufficiently small, the solution map for the low frequency part is analytic in $L^2(\mathbb R)$, while the solution map for the residual part fails to be $C^2$. Moreover, we establish shallow-water convergence in $L^2(\mathbb R)$ of the low frequency dynamics to KdV. This explains the mechanism of the regularity gain of the solution map in the shallow-water limit.