Global existence and scattering for the inhomogeneous nonlinear Schr\"odinger equation

Abstract

In this paper we consider the inhomogeneous nonlinear Schr\"odinger equation i∂t u + u=K(x)|u|α u,\, u(0)=u0∈ Hs( RN),\, s=0,\,1, N≥ 1, |K(x)|+|x|s|∇sK(x)| |x|-b, 0<b<(2,N-2s), 0<α<(4-2b)/(N-2s). We obtain novel results of global existence for oscillating initial data and scattering theory in a weighted L2-space for a new range α0(b)<α<(4-2b)/N. The value α0(b) is the positive root of Nα2+(N-2+2b)α-4+2b=0, which extends the Strauss exponent known for b=0. Our results improve the known ones for K(x)=μ|x|-b, μ∈ C and apply for more general potentials. In particular, we show the impact of the behavior of the potential at the origin and infinity on the allowed range of α. Some decay estimates are also established for the defocusing case. To prove the scattering results, we give a new criterion taking into account the potential K.