Weak Dispersive estimates for Schr\"odinger equations with long range potentials

Abstract

We prove some local smoothing estimates for the Schr\"odinger initial value problem with data in L2(Rd), d ≥ 2 and a general class of potentials. In the repulsive setting we have to assume just a power like decay (1+|x|)-γ for some γ>0. Also attractive perturbations are considered. The estimates hold for all time and as a consequence a weak dispersion of the solution is obtained. The proofs are based on similar estimates for the corresponding stationary Helmholtz equation and Kato H-smooth theory.