A weighted dispersive estimate for Schr\"odinger operators in dimension two
Abstract
Let H=-+V, where V is a real valued potential on 2 satisfying |V(x)| x-3-. We prove that if zero is a regular point of the spectrum of H=-+V, then \|w-1 eitHPacf\|L∞(2) 1|t|2(|t|) \|w f\|L1(2), |t| >2, with w(x)=2(2+|x|). This decay rate was obtained by Murata in the setting of weighted L2 spaces with polynomially growing weights.
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