Continuum of finite point blowup rates for the critical generalized Korteweg-de Vries equation

Abstract

For any ∈( 37,12), we prove the existence of an H1 solution u of the mass critical generalized Korteweg-de Vries equation on the time interval (0,T0], for some T0>0, which blows up at the time t=0 and at the point x=0 with the rate \|∂x u (t,x)\|L2 ≈ t-. Such a blowup rate is associated to a blowup residue of the form rα(x)= xα - 12 for x>0 close to the blowup point, where α=3-12-4. The condition ∈(37,12) is equivalent to α>1, which corresponds to the full range for which the residue rα belongs to H1. Such blowup at a finite point is in contrast with all the blowup solutions constructed for this equation, except the one constructed previously by the authors corresponding to the special value = 25. Finally, we present some open problems regarding the blowup phenomenon for the mass critical gKdV equation.