Ray tomography for imaging the Earth
Main funder
Funder's project number: 295853
Funds granted by main funder (€)
- 259 068,00
Funding program
Project timetable
Project start date: 01/09/2016
Project end date: 31/08/2019
Summary
The purpose of the project is to study mathematical problems that are related to imaging the Earth. Because it is practically impossible to get deep beneath the surface, the measurements need to be done indirectly. Interpretation of indirect measurements leads to difficult mathematical problems, and solving them is the main goal of this project. The research is pure mathematics motivated by real practical problems.
Principal Investigator
Primary responsible unit
Fields of science
Related publications and other outputs
- Broken ray tensor tomography with one reflecting obstacle (2022) Ilmavirta, Joonas; et al.; A1; OA
- Spectral rigidity for spherically symmetric manifolds with boundary (2022) de Hoop, Maarten V.; et al.; A1; OA
- A foliated and reversible Finsler manifold is determined by its broken scattering relation (2021) de Hoop, Maarten V.; et al.; A1; OA
- The Light Ray Transform in Stationary and Static Lorentzian Geometries (2021) Feizmohammadi, Ali; et al.; A1; OA
- Geodesic ray transform with matrix weights for piecewise constant functions (2020) Ilmavirta, Joonas; et al.; A1; OA
- Optimal recovery of a radiating source with multiple frequencies along one line (2020) Brander, Tommi; et al.; A1; OA
- Unique continuation of the normal operator of the X-ray transform and applications in geophysics (2020) Ilmavirta, Joonas; et al.; A1; OA
- Higher-order Hamilton-Jacobi perturbation theory for anisotropic heterogeneous media : Dynamic ray tracing in Cartesian coordinates (2019) Iversen, Einar; et al.; A1; OA
- Tensor tomography in periodic slabs (2018) Ilmavirta, Joonas; et al.; A1; OA
- Abel transforms with low regularity with applications to x-ray tomography on spherically symmetric manifolds (2017) Hoop, Maarten V de; et al.; A1; OA
