On the Unboundedness of Higher Regularity Sobolev Norms of Solutions for the Critical Schr\"odinger-Debye System with Vanishing Relaxation Delay

Abstract

We consider the Schr\"odinger-Debye system in Rn, for n=3,4. Developing on previously known local well-posedness results, we start by establishing global well-posedness in H1(R3)× L2(R3) for a broad class of initial data. We then concentrate on the initial value problem in n=4, which is the energy-critical dimension for the corresponding cubic nonlinear Schr\"odinger equation. We start by proving local well-posedness in H1(R4)× H1(R4). Then, for the focusing case of the system, we derive a virial type identity and use it to prove that for radially symmetric smooth initial data with negative energy, there is a positive time T0, depending only on the data, for which, either the H1(R4)× H1(R4) solutions blow-up in [0,T0], or the higher regularity Sobolev norms are unbounded on the intervals [0, T], for T>T0, as the delay parameter vanishes. We finish by presenting a global well-posedness result for regular initial data which is small in the H1(R4)× H1(R4) norm.