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A reflection approach to the broken ray transform

Joonas Ilmavirta

subject

Mathematics - Differential GeometryPure mathematicsGeodesicmatematiikkaGeneral MathematicsAstrophysics::High Energy Astrophysical PhenomenaInjective functionManifold53C65 78A05 (Primary) 35R30 58J32 (Secondary)Mathematics - Analysis of PDEsReflection (mathematics)Differential Geometry (math.DG)Euclidean geometryFOS: MathematicsSPHERESMathematics::Differential GeometryCounterexampleMathematicsbroken ray transformAnalysis of PDEs (math.AP)

description

We reduce the broken ray transform on some Riemannian manifolds (with corners) to the geodesic ray transform on another manifold, which is obtained from the original one by reflection. We give examples of this idea and present injectivity results for the broken ray transform using corresponding earlier results for the geodesic ray transform. Examples of manifolds where the broken ray transform is injective include Euclidean cones and parts of the spheres $S^n$. In addition, we introduce the periodic broken ray transform and use the reflection argument to produce examples of manifolds where it is injective. We also give counterexamples to both periodic and nonperiodic cases. The broken ray transform arises in Calder\'on's problem with partial data, and we give implications of our results for this application.

yearjournalcountryeditionlanguage
2013-06-03
https://dx.doi.org/10.48550/arxiv.1306.0341