Add to ORKGStarting from a breakthrough result by Gelfand and Graev, inversion of the Hilbert transform became a very important tool for image reconstruction in tomography. In particular, their result is useful when the tomographic data are truncated and one deals with an interior problem. As was established recently, the interior problem admits a stable and unique solution when some a priori information about the object being scanned is available. The most common approach to solving the interior problem is based on converting it to the Hilbert transform and performing analytic continuation. Depending on what type of tomographic data are available, one gets different Hilbert inversion problems. In this paper, we consider two such problems and establis...
Historically, computed tomography reconstructions from truncated projection data have been consider...
We continue the study of stability of solving the interior problem of tomography. The starting point...
As is known, solving the interior problem with prior data specified on a finite collection of inter...
Starting from a breakthrough result by Gelfand and Graev, inversion of the Hilbert transform became ...
Hilbert transform is a very important tool in computed tomography. Image reconstruction from truncat...
Hilbert transform is a very important tool in computed tomography. Image reconstruction from truncat...
We present new results on the singular value decomposition (SVD) of the truncated Hilbert transform ...
In limited data computerized tomography, the 2D or 3D problem can be reduced to a family of 1D probl...
The long-standing interior problem has important mathematical and practical implications. The recent...
International audienceIn computed tomography, a whole scan of the object may be impossible, generall...
Using the Gelfand-Graev formula, the interior problem of tomography reduces to the inversion of the ...
Using the Gelfand-Graev formula, the interior problem of tomography reduces to the inversion of the ...
International audienceIn computed tomography, a scan of the whole object may be impossible, leading ...
As is known, solving the interior problem with prior data specified on a finite collection of interv...
Historically, computed tomography reconstructions from truncated projection data have been consider...
We continue the study of stability of solving the interior problem of tomography. The starting point...
As is known, solving the interior problem with prior data specified on a finite collection of inter...
Starting from a breakthrough result by Gelfand and Graev, inversion of the Hilbert transform became ...
Hilbert transform is a very important tool in computed tomography. Image reconstruction from truncat...
Hilbert transform is a very important tool in computed tomography. Image reconstruction from truncat...
We present new results on the singular value decomposition (SVD) of the truncated Hilbert transform ...
In limited data computerized tomography, the 2D or 3D problem can be reduced to a family of 1D probl...
The long-standing interior problem has important mathematical and practical implications. The recent...
International audienceIn computed tomography, a whole scan of the object may be impossible, generall...
Using the Gelfand-Graev formula, the interior problem of tomography reduces to the inversion of the ...
Using the Gelfand-Graev formula, the interior problem of tomography reduces to the inversion of the ...
International audienceIn computed tomography, a scan of the whole object may be impossible, leading ...
As is known, solving the interior problem with prior data specified on a finite collection of interv...
Historically, computed tomography reconstructions from truncated projection data have been consider...
We continue the study of stability of solving the interior problem of tomography. The starting point...
As is known, solving the interior problem with prior data specified on a finite collection of inter...