Mosco convergence for \(H(\text{curl})\) spaces, higher integrability for Maxwell's equations, and stability in direct and inverse EM scattering problems
From MaRDI portal
Publication:2327706
DOI10.4171/JEMS/895zbMath1502.78020arXiv1603.07555MaRDI QIDQ2327706
Hongyu Liu, Jingni Xiao, Luca Rondi
Publication date: 15 October 2019
Published in: Journal of the European Mathematical Society (JEMS) (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1603.07555
stabilityMosco convergencescatteringMaxwell equationsinverse scatteringhigher integrabilitypolyhedral scatterers
Scattering theory for PDEs (35P25) Inverse problems for PDEs (35R30) Methods involving semicontinuity and convergence; relaxation (49J45) Diffraction, scattering (78A45) Inverse problems (including inverse scattering) in optics and electromagnetic theory (78A46) Maxwell equations (35Q61)
Related Items (34)
Stable determination by a single measurement, scattering bound and regularity of transmission eigenfunctions ⋮ Numerical Methods for Semilinear Fractional Diffusion Equations with Time Delay ⋮ Nearly non-scattering electromagnetic wave set and its application ⋮ On local and global structures of transmission eigenfunctions and beyond ⋮ On an artificial neural network for inverse scattering problems ⋮ Localized Sensitivity Analysis at High-Curvature Boundary Points of Reconstructing Inclusions in Transmission Problems ⋮ Stable determination of an elastic medium scatterer by a single far-field measurement and beyond ⋮ On an inverse boundary problem arising in brain imaging ⋮ Identification of cavities and inclusions in linear elasticity with a phase-field approach ⋮ Scattering by Finely Layered Obstacles: Frequency-Explicit Bounds and Homogenization ⋮ Explicit bounds for the high-frequency time-harmonic Maxwell equations in heterogeneous media ⋮ Imaging multiple magnetized anomalies by geomagnetic monitoring ⋮ Identifying varying magnetic anomalies using geomagnetic monitoring ⋮ Wavenumber-Explicit Parametric Holomorphy of Helmholtz Solutions in the Context of Uncertainty Quantification ⋮ On Electromagnetic Scattering from a Penetrable Corner ⋮ On simultaneous recovery of sources/obstacles and surrounding mediums by boundary measurements ⋮ On nodal and generalized singular structures of Laplacian eigenfunctions and applications to inverse scattering problems ⋮ Two single-measurement uniqueness results for inverse scattering problems within polyhedral geometries ⋮ Some recent progress on inverse scattering problems within general polyhedral geometry ⋮ On generalized Holmgren's principle to the Lamé operator with applications to inverse elastic problems ⋮ On a novel inverse scattering scheme using resonant modes with enhanced imaging resolution ⋮ Stable Determination of a Rigid Scatterer in Elastodynamics ⋮ On an electromagnetic problem in a corner and its applications ⋮ Generating geometric body shapes with electromagnetic source scattering techniques ⋮ A neural network method for the inverse scattering problem of impenetrable cavities ⋮ A neural network scheme for recovering scattering obstacles with limited phaseless far-field data ⋮ Scattering by Curvatures, Radiationless Sources, Transmission Eigenfunctions, and Inverse Scattering Problems ⋮ On the geometric structures of transmission eigenfunctions with a conductive boundary condition and applications ⋮ Unique continuation from a generalized impedance edge-corner for Maxwell’s system and applications to inverse problems ⋮ Mosco convergence of Sobolev spaces and Sobolev inequalities for nonsmooth domains ⋮ On Novel Geometric Structures of Laplacian Eigenfunctions in $\mathbb{R}^3$ and Applications to Inverse Problems ⋮ Boundary Homogenization of a Class of Obstacle Problems ⋮ Unique solvability and stability of the time domain electromagnetic scattering problem with a locally perturbed perfectly conducting plate ⋮ On Geometrical Properties of Electromagnetic Transmission Eigenfunctions and Artificial Mirage
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Higher \(L^p\) regularity for vector fields that satisfy divergence and rotation constraints in dual Sobolev spaces, and application to some low-frequency Maxwell equations
- Stable determination of sound-hard polyhedral scatterers by a minimal number of scattering measurements
- A variational approach to the reconstruction of cracks by boundary measurements
- Inverse acoustic and electromagnetic scattering theory.
- Three-spheres theorem for second order elliptic equations
- Nonunique continuation for the Maxwell system
- Stability for the acoustic scattering problem for sound-hard scatterers
- Convergence of convex sets and of solutions of variational inequalities
- Time-Harmonic Maxwell Equations in the Exterior of Perfectly Conducting, Irregular Obstacles
- Quantitative uniqueness estimate for the Maxwell system with Lipschitz anisotropic media
- Uniqueness in determining polygonal sound-hard obstacles with a single incoming wave
- On unique determination of partially coated polyhedral scatterers with far field measurements
- A remark on the regularity of solutions of Maxwell's equations on Lipschitz domains
- Uniqueness in determining polyhedral sound-hard obstacles with a single incoming wave
- A global uniqueness for formally determined inverse electromagnetic obstacle scattering
- Stable determination of sound-soft polyhedral scatterers by a single measurement
- Continuity of neumann linear elliptic problems on varying two—dimensional bounded open sets
- Uniqueness in an inverse scattering problem within non-trapping polygonal obstacles with at most two incoming waves
- Unique determination of non-smooth sound-soft scatterers by finitely many far-field measurements
- Stabilité de la solution d'un problème de Neumann pour des variations de frontière
- ON UNIQUENESS FOR TIME HARMONIC ANISOTROPIC MAXWELL'S EQUATIONS WITH PIECEWISE REGULAR COEFFICIENTS
- Determining a sound-soft polyhedral scatterer by a single far-field measurement
- A General Chain Rule for Distributional Derivatives
- Finite Element Methods for Maxwell's Equations
- Uniqueness in an inverse acoustic obstacle scattering problem for both sound-hard and sound-soft polyhedral scatterers
- Reflection principle for the Maxwell equations and its application to inverse electromagnetic scattering
- Sobolev Spaces
- Inverse problems for partial differential equations
- Acoustic and electromagnetic equations. Integral representations for harmonic problems
This page was built for publication: Mosco convergence for \(H(\text{curl})\) spaces, higher integrability for Maxwell's equations, and stability in direct and inverse EM scattering problems
