On the mass-critical generalized KdV equation

Abstract

We consider the mass-critical generalized Korteweg--de Vries equation (∂t + ∂xxx)u= ∂x(u5) for real-valued functions u(t,x). We prove that if the global well-posedness and scattering conjecture for this equation failed, then, conditional on a positive answer to the global well-posedness and scattering conjecture for the mass-critical nonlinear Schr\"odinger equation (-i∂t + ∂xx)u= (|u|4u), there exists a minimal-mass blowup solution to the mass-critical generalized KdV equation which is almost periodic modulo the symmetries of the equation. Moreover, we can guarantee that this minimal-mass blowup solution is either a self-similar solution, a soliton-like solution, or a double high-to-low frequency cascade solution.