Spectral stability of periodic wave trains of the Korteweg-de Vries/Kuramoto-Sivashinsky equation in the Korteweg-de Vries limit

TL;DR

This paper analyzes the spectral stability of periodic wave trains in the Korteweg-de Vries/Kuramoto-Sivashinsky equation as the parameter delta approaches zero, combining rigorous perturbation analysis with numerical evaluation to establish stability conclusions.

Contribution

It provides a rigorous singular perturbation analysis for stability of wave trains in the KdV-KS equation in the small delta limit, extending previous formal and numerical results.

Findings

Complete stability conclusions up to machine error.

Analysis of large-frequency and small Bloch-parameter regimes.

Novel techniques for treating regimes not studied previously.

Abstract

We study the spectral stability of a family of periodic wave trains of the Korteweg-de Vries/Kuramoto-Sivashinsky equation $ \partial_t v+v\partial_x v+\partial_x^3 v+\delta(\partial_x^2 v +\partial_x^4 v)=0$, $\delta>0$, in the Korteweg-de Vries limit $\delta\to 0$, a canonical limit describing small-amplitude weakly unstable thin film flow. More precisely, we carry out a rigorous singular perturbation analysis reducing the problem to the evaluation for each Bloch parameter $\xi\in [0,2\pi]$ of certain elliptic integrals derived formally (on an incomplete set of frequencies/Bloch parameters, hence as necessary conditions for stability) and numerically evaluated by Bar and Nepomnyashchy \cite{BN}, thus obtaining, up to machine error, complete conclusions about stability. The main technical difficulty is in treating the large-frequency and small Bloch-parameter regimes not studied by Bar and Nepomnyashchy \cite{BN}, which requires techniques rather different from classical Fenichel-type analysis. The passage from small-$\delta$ to small-$\xi$ behavior is particularly interesting, using in an essential way an analogy with hyperbolic relaxation at the level of the Whitham modulation equations.