A weighted estimate for two dimensional Schrodinger, matrix schrodinger and wave equations with resonance of first kind at zero energy

Abstract

We study the two dimensional Schr\"odinger operator, H=-+V, in the weighted L1(2) → L∞(2) setting when there is a resonance of the first kind at zero energy. In particular, we show that if |V(x)| x -3- and there is only s-wave resonance at zero of H, then \| w-1 ( eitHPac f - 1 t F f ) \| ∞ ≤ C |t| (|t|)2 \|wf\|1 |t|>2, with w(x)=2(2+|x|). Here Ff=c f, , where is an s-wave resonance function. We also extend this result to matrix Schr\"odinger and wave equations with potentials under similar conditions.