On sharp scattering threshold for the mass-energy double critical NLS via double track profile decomposition

Abstract

The present paper is concerned with the large data scattering problem for the mass-energy double critical NLS align i∂t u+ u |u|4du |u|4d-2u=0DCNLS align in H1(Rd) with d≥ 3. In the defocusing-defocusing regime, Tao, Visan and Zhang show that the unique solution of DCNLS is global and scattering in time for arbitrary initial data in H1(Rd). This does not hold when at least one of the nonlinearities is focusing, due to the possible formation of blow-up and soliton solutions. However, precise thresholds for a solution of DCNLS being scattering were open in all the remaining regimes. Following the classical concentration compactness principle, we impose sharp scattering thresholds in terms of ground states for DCNLS in all the remaining regimes. The new challenge arises from the fact that the remainders of the standard L2- or H1-profile decomposition fail to have asymptotically vanishing diagonal L2- and H1-Strichartz norms simultaneously. To overcome this difficulty, we construct a double track profile decomposition which is capable to capture the low, medium and high frequency bubbles within a single profile decomposition and possesses remainders that are asymptotically small in both of the diagonal L2- and H1-Strichartz spaces.