Asymptotic stability of solitons of the gKdV equations with general nonlinearity

Abstract

We consider the generalized Korteweg-de Vries equation ∂t u + ∂x (∂x2 u + f(u))=0, (t,x)∈ [0,T)× R, (1) with general C3 nonlinearity f. Under an explicit condition on f and c>0, there exists a solution in the energy space H1 of (1) of the type u(t,x)=Qc(x-x0-ct), called soliton. In this paper, under general assumptions on f and Qc, we prove that the family of soliton solutions around Qc is asymptotically stable in some local sense in H1, i.e. if u(t) is close to Qc (for all t≥ 0), then u(t) locally converges in the energy space to some Qc+ as t +∞. Note in particular that we do not assume the stability of Qc. This result is based on a rigidity property of equation (1) around Qc in the energy space whose proof relies on the introduction of a dual problem. These results extend the main results in previous works devoted to the pure power case.