On the observability of the Schr\"odinger equation in the torus from open sets

Abstract

We study the observability of the Schr\"odinger equation on the d-dimensional torus Td, d ≥ 1, from an open subset ω ⊂ Td. Our first main result establishes a quantitative observability estimate for the free Schr\"odinger equation in the regime of small times T and for small observation sets of the form ω = Πj=1d(aj,bj). Our second main result shows that observability holds for the Schr\"odinger equation with a merely bounded potential V ∈ L∞( Td), in any dimension d ≥ 1, for every time T>0 and every nonempty open subset ω. This resolves a well-known conjecture in the field. A central ingredient in the proof is a cluster decomposition method combined with an induction scheme introduced by Bourgain and further developed by Burq and Zhu.