Add to ORKGWe study the problem of proper discretizing and sampling issues related to geodesic X-ray transforms on simple surfaces, and illustrate the theory on simple geodesic disks of constant curvature. Given a notion of band limit on a function, we provide the minimal sampling rates of its X-ray transform for a faithful reconstruction. In Cartesian sampling, we quantify the quality of a sampling scheme depending on geometric parameters of the surface (e.g. curvature and boundary curvature), and the coordinate system used to represent the space of geodesics. When aliasing happens, we explain how to predict the location, orientation and frequency of the artifacts.Comment: 31 pages, 14 figure
A sampling theorem on the sphere has been developed recently, requiring half as many samples as alte...
We prove that the geodesic X-ray transform is injective on scalar functions and (solenoidally) on on...
We study the impact of sampling theorems on the fidelity of sparse image reconstruction on the spher...
We prove that the geodesic X-ray transform is injective on $L^2$ when the Riemannian metric is simpl...
Sampling theorems describe which types of signals can be reconstructed and under which conditions. I...
We consider the problem of reconstructing a compactly supported function from samples of its Fourier...
1 Introduction Sampling is a process of discretizing a continuous surface or acurve into discrete sa...
We study the microlocal properties of the geodesic X-ray transform X on a manifold with boundary all...
In this article, we characterize the strength of reconstructed singularities and the artifacts in a ...
This paper describes a method for reconstructing 3D frontier points, contour generators and surfaces...
We explain how the theory of A-analytic maps of A. Bukhgeim can apply to a local CT inversion proble...
The state of the art in sampling theory now contains several theorems for signals that are non-bandl...
We discuss a novel sampling theorem on the sphere developed by McEwen & Wiaux recently through an as...
We develop a novel sampling theorem on the sphere and corresponding fast algorithms by associating t...
The goal of surface reconstruction is to obtain a continuous representation of a surface described b...
A sampling theorem on the sphere has been developed recently, requiring half as many samples as alte...
We prove that the geodesic X-ray transform is injective on scalar functions and (solenoidally) on on...
We study the impact of sampling theorems on the fidelity of sparse image reconstruction on the spher...
We prove that the geodesic X-ray transform is injective on $L^2$ when the Riemannian metric is simpl...
Sampling theorems describe which types of signals can be reconstructed and under which conditions. I...
We consider the problem of reconstructing a compactly supported function from samples of its Fourier...
1 Introduction Sampling is a process of discretizing a continuous surface or acurve into discrete sa...
We study the microlocal properties of the geodesic X-ray transform X on a manifold with boundary all...
In this article, we characterize the strength of reconstructed singularities and the artifacts in a ...
This paper describes a method for reconstructing 3D frontier points, contour generators and surfaces...
We explain how the theory of A-analytic maps of A. Bukhgeim can apply to a local CT inversion proble...
The state of the art in sampling theory now contains several theorems for signals that are non-bandl...
We discuss a novel sampling theorem on the sphere developed by McEwen & Wiaux recently through an as...
We develop a novel sampling theorem on the sphere and corresponding fast algorithms by associating t...
The goal of surface reconstruction is to obtain a continuous representation of a surface described b...
A sampling theorem on the sphere has been developed recently, requiring half as many samples as alte...
We prove that the geodesic X-ray transform is injective on scalar functions and (solenoidally) on on...
We study the impact of sampling theorems on the fidelity of sparse image reconstruction on the spher...