Compactness of iso-resonant potentials for Schr\"odinger operators in dimensions one and three

Abstract

We prove compactness of a restricted set of real-valued, compactly supported potentials V for which the corresponding Schr\"odinger operators HV have the same resonances, including multiplicities. More specifically, let BR(0) be the ball of radius R > 0 about the origin in Rd, for d=1,3. Let IR (V0) be the set of real-valued potentials in C0∞( BR(0); R) so that the corresponding Schr\"odinger operators have the same resonances, including multiplicities, as HV0. We prove that the set IR (V0) is a compact subset of C0∞ (BR(0)) in the C∞-topology. An extension to Sobolev spaces of less regular potentials is discussed.