Full family of flattening solitary waves for the mass critical generalized KdV equation

Abstract

For the mass critical generalized KdV equation ∂t u + ∂x (∂x2 u + u5)=0 on R, we construct a full family of flattening solitary wave solutions. Let Q be the unique even positive solution of Q''+Q5=Q. For any ∈ (0, 13), there exist global (for t≥ 0) solutions of the equation with the asymptotic behavior equation* u(t,x)= t-2 Q(t- (x-x(t)))+w(t,x) equation* where, for some c>0, equation* x(t) c t1-2 and \|w(t)\|H1(x> 12 x(t)) 0 as t +∞. equation* Moreover, the initial data for such solutions can be taken arbitrarily close to a solitary wave in the energy space. The long-time flattening of the solitary wave is forced by a slowly decaying tail in the initial data. This result and its proof are inspired and complement recent blow-up results for the critical generalized KdV equation. This article is also motivated by previous constructions of exotic behaviors close to solitons for other nonlinear dispersive equations such as the energy-critical wave equation.