Spectral multipliers for Schr\"odinger operators

Abstract

We prove a sharp H\"ormander multiplier theorem for Schr\"odinger operators H=-+V on Rn. The result is obtained under certain condition on a weighted L∞ estimate, coupled with a weighted L2 estimate for H, which is a weaker condition than that for nonnegative operators via the heat kernel approach. Our approach is elaborated in one dimension with potential V belonging to certain critical weighted L1 class. Namely, we assume that ∫ (1+|x|) |V(x)|dx is finite and H has no resonance at zero. In the resonance case we assume ∫ (1+|x|2) |V(x)| dx is finite.