QUANTITATIVE OBSERVABILITY FOR ONE-DIMENSIONAL SCHR ÖDINGER EQUATIONS WITH POTENTIALS - Université Paris-Est-Créteil-Val-de-Marne
Article Dans Une Revue Journal of Functional Analysis Année : 2025

QUANTITATIVE OBSERVABILITY FOR ONE-DIMENSIONAL SCHR ÖDINGER EQUATIONS WITH POTENTIALS

Résumé

In this note, we prove the quantitative observability with an explicit control cost for the 1D Schrödinger equation over R with real-valued, bounded continuous potential on thick sets. Our proof relies on different techniques for low-frequency and high-frequency estimates. In particular, we extend the large time observability result for the 1D free Schrödinger equation in Theorem 1.1 of Huang-Wang-Wang [20] to any short time. As another byproduct, we extend the spectral inequality of Lebeau-Moyano [27] for real-analytic potentials to bounded continuous potentials in the one-dimensional case.
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Dates et versions

hal-04199621 , version 1 (07-09-2023)

Identifiants

Citer

Pei Su, Chenmin Sun, X U Yuan. QUANTITATIVE OBSERVABILITY FOR ONE-DIMENSIONAL SCHR ÖDINGER EQUATIONS WITH POTENTIALS. Journal of Functional Analysis, In press, 288 (2), pp.110695. ⟨10.1016/j.jfa.2024.110695⟩. ⟨hal-04199621⟩
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