A1 Journal article (refereed)
Monotonicity and local uniqueness for the Helmholtz equation (2019)


Harrach, B., Pohjola, V., & Salo, M. (2019). Monotonicity and local uniqueness for the Helmholtz equation. Analysis and PDE, 12(7), 2019. https://doi.org/10.2140/apde.2019.12.1741


JYU authors or editors


Publication details

All authors or editorsHarrach, Bastian; Pohjola, Valter; Salo, Mikko

Journal or seriesAnalysis and PDE

ISSN2157-5045

eISSN1948-206X

Publication year2019

Volume12

Issue number7

Pages range2019

Article number1741-1771

PublisherMathematical Sciences Publishers

Publication countryUnited States

Publication languageEnglish

DOIhttps://doi.org/10.2140/apde.2019.12.1741

Publication open access

Publication channel open access

Publication is parallel published (JYX)https://jyx.jyu.fi/handle/123456789/65183

Publication is parallel publishedhttps://arxiv.org/abs/1709.08756


Abstract

This work extends monotonicity-based methods in inverse problems to the case of the Helmholtz (or stationary Schrödinger) equation (1 + k2q)u = 0 in a bounded domain for fixed nonresonance frequency k > 0 and real-valued scattering coefficient function q. We show a monotonicity relation between the scattering coefficient q and the local Neumann-to-Dirichlet operator that holds up to finitely many eigenvalues. Combining this with the method of localized potentials, or Runge approximation, adapted to the case where finitely many constraints are present, we derive a constructive monotonicitybased characterization of scatterers from partial boundary data. We also obtain the local uniqueness result that two coefficient functions q1 and q2 can be distinguished by partial boundary data if there is a
neighborhood of the boundary part where q1 ≥ q2 and q1 6≡ q2.


Keywordsinverse problems

Free keywordsinverse coefficient problems; Helmholtz equation; stationary Schrödinger equation; monotonicity, localized
potentials


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Ministry reportingYes

Reporting Year2019

JUFO rating3


Last updated on 2024-11-03 at 14:24