Stability of traveling waves for the Burgers-Hilbert equation

Abstract

We consider smooth solutions of the Burgers-Hilbert equation that are a small perturbation δ from a global periodic traveling wave with small amplitude ε. We use a modified energy method to prove the existence time of smooth solutions on a time scale of 1εδ with 0<δε1 and on a time scale of εδ2 with 0<δε21. Moreover, we show that the traveling wave exists for an amplitude ε in the range (0,ε*) with ε* 0.23 and fails to exist for ε>2e.