Asymptotic stability of Benjamin--Ono multisolitons in L2( R)

Abstract

We prove the following dichotomy result for L2( R) solutions to the Benjamin--Ono equation: On windows traveling at any speed, the solution either converges to zero or to a soliton dictated by the spectral properties of the Lax operator associated to the initial data. As an application of this result, we prove asymptotic stability of Benjamin--Ono multisolitons in L2( R). Specifically, we show that solutions to the Benjamin--Ono equation emanating from small L2( R) perturbations of multisolitons evolve towards a series of separating one-solitons when viewed in windows traveling with these solitons.