A dispersive bound for three-dimensional Schroedinger operators with zero energy eigenvalues

Abstract

We prove a dispersive estimate for the evolution of Schroedinger operators H = - + V(x) in R3. The potential is allowed to be a complex-valued function belonging to Lp(3) Lq(3), p < 32 < q, so that H need not be self-adjoint or even symmetric. Some additional spectral conditions are imposed, namely that no resonances of H exist anywhere within the interval [0,∞) and that eigenfunctions at zero (including generalized eigenfunctions) decay rapidly enough to be integrable.