6533b835fe1ef96bd129ea19
RESEARCH PRODUCT
Identification of small inhomogeneities: Asymptotic factorization
Martin HankeRoland GriesmaierHabib Ammarisubject
Computational MathematicsAlgebra and Number TheoryPartial differential equationFactorizationApplied MathematicsNumerical analysisMathematical analysisBoundary (topology)Boundary value problemInverse problemAsymptotic expansionIntegral equationMathematicsdescription
We consider the boundary value problem of calculating the electrostatic potential for a homogeneous conductor containing finitely many small insulating inclusions. We give a new proof of the asymptotic expansion of the electrostatic potential in terms of the background potential, the location of the inhomogeneities and their geometry, as the size of the inhomogeneities tends to zero. Such asymptotic expansions have already been used to design direct (i.e. noniterative) reconstruction algorithms for the determination of the location of the small inclusions from electrostatic measurements on the boundary, e.g. MUSIC-type methods. Our derivation of the asymptotic formulas is based on integral equation methods. It demonstrates the strong relation between factorization methods and MUSIC-type methods for the solution of this inverse problem.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2007-02-19 | Mathematics of Computation |