Local and Global Well-Posedness for the Critical Schrodinger-Debye System

Abstract

We establish local well-posedness results for the Initial Value Problem associated to the Schr\"odinger-Debye system in dimensions N=2, 3 for data in Hs× H, with s and satisfying \0, s-1\ \2s, s+1\. In particular, these include the energy space H1× L2. Our results improve the previous ones obtained in Bidegaray1, Bidegaray2 and Corcho-Linares. Moreover, in the critical case (N=2) and for initial data in H1× L2, we prove that solutions exist for all times, thus providing a negative answer to the open problem mentioned in Fibich-Papanicolau concerning the formation of singularities for these solutions.