A globally convergent numerical method for a 1-d inverse medium problem with experimental data

From MaRDI portal

Publication:338604

Jump to:navigation, search

DOI10.3934/ipi.2016032zbMath1355.34040arXiv1602.09092OpenAlexW2962970054MaRDI QIDQ338604

Michael V. Klibanov, Anders Sullivan, Loc Hoang Nguyen, Lam H. Nguyen

Publication date: 7 November 2016

Published in: Inverse Problems and Imaging (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/1602.09092

zbMATH Keywords

electromagnetic waves coefficient inverse scattering problem dielectric constant globally convergent algorithm

Mathematics Subject Classification ID

Inverse problems involving ordinary differential equations (34A55) Linear boundary value problems for ordinary differential equations (34B05) Inverse problems (including inverse scattering) in optics and electromagnetic theory (78A46) Boundary value problems on infinite intervals for ordinary differential equations (34B40)

Related Items

Global reconstruction of initial conditions of nonlinear parabolic equations via the Carleman-contraction method ⋮ Convexity of a discrete Carleman weighted objective functional in an inverse medium scattering problem ⋮ Solving a 1-D inverse medium scattering problem using a new multi-frequency globally strictly convex objective functional ⋮ A globally convergent numerical method for a 3D coefficient inverse problem with a single measurement of multi-frequency data ⋮ Globally Strictly Convex Cost Functional for a 1-D Inverse Medium Scattering Problem with Experimental Data ⋮ Convexification for a 1D hyperbolic coefficient inverse problem with single measurement data ⋮ Convexification of a 3-D coefficient inverse scattering problem ⋮ Convexification-based globally convergent numerical method for a 1D coefficient inverse problem with experimental data ⋮ A Hölder stability estimate for a 3D coefficient inverse problem for a hyperbolic equation with a plane wave ⋮ Convexification for an inverse problem for a 1D wave equation with experimental data ⋮ Convexification for a Three-Dimensional Inverse Scattering Problem with the Moving Point Source ⋮ Inverse scattering for the one-dimensional Helmholtz equation with piecewise constant wave speed ⋮ A new version of the convexification method for a 1D coefficient inverse problem with experimental data ⋮ Recovering the initial condition of parabolic equations from lateral Cauchy data via the quasi-reversibility method ⋮ Direct collocation method for identifying the initial conditions in the inverse wave problem using radial basis functions

Uses Software

Armadillo

Cites Work

Retrieved from "https://portal.mardi4nfdi.de/w/index.php?title=Publication:338604&oldid=12211882"