Stability of traveling waves for the Burgers-Hilbert equation

Ángel Castro, Diego Córdoba, Fan Zheng

Published 2021-03-04Version 1

We consider smooth solutions of the Burgers-Hilbert equation that are a small perturbation $\delta$ from a global periodic traveling wave with small amplitude $\epsilon$. We use a modified energy method to prove the existence time of smooth solutions on a time scale of $\frac{1}{\epsilon\delta}$ with $0<\delta\ll\epsilon\ll1$ and on a time scale of $\frac{\epsilon}{\delta^2}$ with $0<\delta\ll\epsilon^2\ll1$. Moreover, we show that the traveling wave exists for an amplitude $\epsilon$ in the range $(0,\epsilon^*)$ with $\epsilon^*\sim 0.29$ and fails to exist for $\epsilon>\frac{2}{e}$.