Dispersive estimates for Schr\"odinger operators in dimension two with obstructions at zero energy

Abstract

We investigate L1(2) L∞(2) dispersive estimates for the Schr\"odinger operator H=-+V when there are obstructions, resonances or an eigenvalue, at zero energy. In particular, we show that the existence of an s-wave resonance at zero energy does not destroy the t-1 decay rate. We also show that if there is a p-wave resonance or an eigenvalue at zero energy then there is a time dependent operator Ft satisfying \|Ft\|L1 L∞ 1 such that \|eitHPac-Ft\|L1 L∞ |t|-1, for |t|>1. We also establish a weighted dispersive estimate with t-1 decay rate in the case when there is an eigenvalue at zero energy but no resonances.