The Small-Dispersion Limit of the Intermediate Long Wave Equation via Semiclassical Soliton Ensembles

Abstract

We study the small dispersion limit of the intermediate long wave (ILW) equation, specifically on a class of well-behaved initial conditions u0 where the number of solitons in the solution increases without bound. First, we conduct a formal WKB-style analysis on the ILW direct scattering problem, generating approximate eigenvalues and norming constants. We then use this to define a modified set of scattering data and rigorously analyze the associated inverse scattering problem. The main results include demonstrating L2-convergence of the solution at t = 0 to the original initial condition u0 and for 0 < t < tc to the associated solution of invicid Burgers' equation, where tc is the time of gradient catastrophe.