On Lp estimates for positivity-preserving Riesz transforms related to Schr\"odinger operators

Abstract

We study the Lp, 1≤slant p≤slant ∞, boundedness for Riesz transforms of the form Va(-12+V)-a, where a>0 and V is a non-negative potential. We prove that Va(-12+V)-a is bounded on Lp(Rd) with 1< p≤slant 2 whenever a≤slant 1/p. We demonstrate that the L∞(Rd) boundedness holds if V satisfies an a-dependent integral condition that is resistant to small perturbations. Similar results with stronger assumptions on V are also obtained on L1(Rd). In particular our L∞ and L1 results apply to non-negative potentials V which globally have a power growth or an exponential growth. We also discuss a counterexample showing that the L∞(Rd) boundedness may fail.