Remarks on Lp-limiting absorption principle of Schr\"odinger operators and applications to spectral multiplier theorems

Abstract

This paper comprises two parts. We first investigate a Lp type of limiting absorption principle for Schr\"odinger operators H=-+V, i.e., In Rn (n 3) we prove the ε-uniform L2(n+1)n+3-L2(n+1)n-1 estimates of the resolvent (H-λ iε)-1 for all λ>0 when the potential V belongs to some integrable spaces and a spectral condition of H at zero is assumed. As an application, we establish a sharp spectral multiplier theorem and Lp bound of Bochner-Riesz means associated with Schr\"odinger operators H. Next, we consider the fractional Schr\"odinger operator H=(-)α+V (0<2α<n) and prove a uniform Hardy-Littlewood-Sobolev inequality for (-)α, which generalizes the corresponding result of Kenig-Ruiz-Sogge KRS.