On the orbital stability of a family of traveling waves for the cubic Schr\"odinger equation on the Heisenberg group

Abstract

We consider the focusing energy-critical Schr\"odinger equation on the Heisenberg group in the radial case\[i∂t u-H1 u=|u|2u,H1=14(∂x2+∂y2)+(x2+y2)∂s2,(t,x,y,s)∈ R×H1,\]which is a model for non-dispersive evolution equations. For this equation, existence of smooth global solutions and uniqueness of weak solutions in the energy space are open problems. We are interested in a family of ground state traveling waves parametrized by their speed β ∈ (-1,1). We show that the traveling waves of speed close to 1 present some orbital stability in the following sense. If the initial data is radial and close enough to one traveling wave, then there exists a global weak solution which stays close to the orbit of this traveling wave for all times. A similar result is proven for the limiting system associated to this equation.