On the decay of solutions to a class of defocusing NLS

Abstract

We consider the following family of Cauchy problems: equation* i∂t u= u - u|u|α, (t,x) ∈ × d equation* u(0)=∈ H1(d) where 0<α< 4d-2 for d≥ 3 and 0<α<∞ for d=1,2. We prove that the Lr-norms of the solutions decay as t ∞, provided that 2<r<2dd-2 when d≥ 3 and 2<r<∞ when d=1,2. In particular we extend previous results obtained by Ginibre and Velo for d≥ 3 and by Nakanishi for d=1,2, where the same decay results are proved under the extra assumption α > 4d.