Semiclassical resolvent estimates for bounded potentials

Abstract

We study the cut-off resolvent of semiclassical Schr\"odinger operators on Rd with bounded compactly supported potentials V. We prove that for real energies λ2 in a compact interval in R+ and for any smooth cut-off function supported in a ball near the support of the potential V, for some constant C>0, one has equation* \| (-h2 + V-λ2)-1 \|L2 H1 ≤ C \,eCh-4/3 1h . equation* This bound shows in particular an upper bound on the imaginary parts of the resonances λ, defined as a pole of the meromorphic continuation of the resolvent (-h2 + V-λ2)-1 as an operator L2comp H2loc: any resonance λ with real part in a compact interval away from 0 has imaginary part at most equation* Im λ ≤ - C-1 \,eCh-4/3 1h . equation* This is related to a conjecture by Landis: The principal Carleman estimate in our proof provides as well a lower bound on the decay rate of L2 solutions u to - u = Vu with 0 V∈ L∞(Rd). We show that there exist a constant M>0 such that for any such u, for R>0 sufficiently large, one has equation* ∫B(0,R+1) B(0,R)|u(x)|2 dx ≥ M-1R-4/3 e-M \|V\|∞2/3 R4/3\|u\|22. equation*