Determining a Random Schrödinger Operator : Both Potential and Source are Random
Li, J., Liu, H., & Ma, S. (2021). Determining a Random Schrödinger Operator : Both Potential and Source are Random. Communications in Mathematical Physics, 381(2), 527-556. https://doi.org/10.1007/s00220-020-03889-9
Published in
Communications in Mathematical PhysicsDate
2021Copyright
© Springer-Verlag GmbH Germany, part of Springer Nature 2020
We study an inverse scattering problem associated with a Schrödinger system where both the potential and source terms are random and unknown. The well-posedness of the forward scattering problem is first established in a proper sense. We then derive two unique recovery results in determining the rough strengths of the random source and the random potential, by using the corresponding far-field data. The first recovery result shows that a single realization of the passive scattering measurements uniquely recovers the rough strength of the random source. The second one shows that, by a single realization of the backscattering data, the rough strength of the random potential can be recovered. The ergodicity is used to establish the single realization recovery. The asymptotic arguments in our study are based on techniques from the theory of pseudodifferential operators and microlocal analysis.
Publisher
SpringerISSN Search the Publication Forum
0010-3616Keywords
Publication in research information system
https://converis.jyu.fi/converis/portal/detail/Publication/47084905
Metadata
Show full item recordCollections
Additional information about funding
The work of J. Li was partially supported by the NSF of China under the Grant Nos. 11571161 and 11731006, the Shenzhen Sci-Tech Fund No. JCYJ20170818153840322. The work of H. Liu was partially supported by Hong Kong RGC general research funds, Nos. 12302017, 12301218, 12302919 and 12301420.License
Related items
Showing items with similar title or keywords.
-
Increasing stability in the linearized inverse Schrödinger potential problem with power type nonlinearities
Lu, Shuai; Salo, Mikko; Xu, Boxi (IOP Publishing, 2022)We consider increasing stability in the inverse Schrödinger potential problem with power type nonlinearities at a large wavenumber. Two linearization approaches, with respect to small boundary data and small potential ... -
Spherically Symmetric Terrestrial Planets with Discontinuities Are Spectrally Rigid
Ilmavirta, Joonas; de Hoop, Maarten V.; Katsnelson, Vitaly (Springer, 2024)We establish spectral rigidity for spherically symmetric manifolds with boundary and interior interfaces determined by discontinuities in the metric under certain conditions. Rather than a single metric, we allow two ... -
The Calderón problem for the fractional Schrödinger equation
Ghosh, Tuhin; Salo, Mikko; Uhlmann, Gunther (Mathematical Sciences Publishers, 2020)We show global uniqueness in an inverse problem for the fractional Schrödinger equation: an unknown potential in a bounded domain is uniquely determined by exterior measurements of solutions. We also show global uniqueness ... -
Stability estimates for the magnetic Schrödinger operator with partial measurements
Potenciano-Machado, Leyter; Ruiz, Alberto; Tzou, Leo (Elsevier BV, 2022)In this article, we study stability estimates when recovering magnetic fields and electric potentials in a simply connected open subset in Rn with n≥3, from measurements on open subsets of its boundary. This inverse problem ... -
The Calderón problem for the fractional Schrödinger equation with drift
Cekić, Mihajlo; Lin, Yi-Hsuan; Rüland, Angkana (Springer, 2020)We investigate the Calderón problem for the fractional Schrödinger equation with drift, proving that the unknown drift and potential in a bounded domain can be determined simultaneously and uniquely by an infinite number ...