6533b82dfe1ef96bd1291516
RESEARCH PRODUCT
The Calderón problem with partial data on manifolds and applications
Carlos E. KenigMikko Salosubject
Mathematics - Differential GeometryPure mathematicsGeodesiccalderón problem35J10Boundary (topology)Conformal mappartial data58J32Integral geometryMathematics - Analysis of PDEsFOS: MathematicsUniquenessMathematicsFlatness (mathematics)Numerical AnalysisCalderón problemEuclidean spaceApplied Mathematicsta11135R30Differential Geometry (math.DG)inverse problemSurface of revolutionAnalysisAnalysis of PDEs (math.AP)description
We consider Calderon's inverse problem with partial data in dimensions $n \geq 3$. If the inaccessible part of the boundary satisfies a (conformal) flatness condition in one direction, we show that this problem reduces to the invertibility of a broken geodesic ray transform. In Euclidean space, sets satisfying the flatness condition include parts of cylindrical sets, conical sets, and surfaces of revolution. We prove local uniqueness in the Calderon problem with partial data in admissible geometries, and global uniqueness under an additional concavity assumption. This work unifies two earlier approaches to this problem (\cite{KSU} and \cite{I}) and extends both. The proofs are based on improved Carleman estimates with boundary terms, complex geometrical optics solutions involving reflected Gaussian beam quasimodes, and invertibility of (broken) geodesic ray transforms. This last topic raises questions of independent interest in integral geometry.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2013-01-01 | Analysis & PDE |