On asymptotic stability of stable Good Boussinesq solitary waves

Abstract

We consider the generalized Good-Boussinesq (GB) model in one dimension, with subcritical power nonlinearity 1<p<5 and data in the energy space H1× L2. This model has solitary waves with speeds c∈ (-1,1). If c2>p-14, Bona and Sachs showed the orbital stability of such waves. Previously, one of us proved that unstable GB standing waves can be perturbed with particular odd-even data in a suitable submanifold of the energy space, leading to the asymptotic stability property if p 2. In this paper we prove that stable GB solitary waves are asymptotically stable in the case of general initial data placed in the energy space for any p 2 and speeds |c|>c+(p)≥ p-14. The proof involves the introduction of a new set of virial estimates specifically adapted to the GB system in a moving setting. In particular, a new virial estimate with mixed variables is considered to treat arbitrary scaling and shift modulations. Another new ingredient is the understanding the corresponding linear matrix operator under mixed orthogonality conditions, a feature absent in our previous works.