Quantitative observability for the Schr\"odinger equation with an anharmonic oscillator

Abstract

This paper studies the observability inequalities for the Schr\"odinger equation associated with an anharmonic oscillator H=-2 x2+|x|. We build up the observability inequality over an arbitrarily short time interval (0,T), with an explicit expression for the observation constant Cobs in terms of T, for some observable set that has a different geometric structure compared to those discussed in HWW. We obtain the sufficient conditions and the necessary conditions for observable sets, respectively. We also present counterexamples to demonstrate that half-lines are not observable sets, highlighting a major difference in the geometric properties of observable sets compared to those of Schr\"odinger operators H=-2 x2+|x|2m with m 1. Our approach is based on the following ingredients: First, the use of an Ingham-type spectral inequality constructed in this paper; second, the adaptation of a quantitative unique compactness argument, inspired by the work of Bourgain-Burq-Zworski Bour13; third, the application of the Szeg\"o's limit theorem from the theory of Toeplitz matrices, which provides a new mathematical tool for proving counterexamples of observability inequalities.