Minimum data image reconstruction algorithms with shift-invariant filtering for helical, cone-beam CT
- 31 March 2005
- journal article
- research article
- Published by IOP Publishing in Physics in Medicine & Biology
- Vol. 50 (8), 1643-1657
- https://doi.org/10.1088/0031-9155/50/8/002
Abstract
We derive accurate and efficient reconstruction algorithms for helical, cone-beam CT that employ shift-invariant filtering. Specifically, a new backprojection-filtration algorithm is developed, and a minimum data filtered-backprojection algorithm is derived. These reconstruction algorithms with shift-invariant filtering can accept data with transverse truncation, and hence allow for minimum data image reconstruction.Keywords
This publication has 14 references indexed in Scilit:
- Recovering a compactly supported function from knowledge of its Hilbert transform on a finite intervalIEEE Signal Processing Letters, 2005
- A two-step Hilbert transform method for 2D image reconstructionPhysics in Medicine & Biology, 2004
- An improved exact filtered backprojection algorithm for spiral computed tomographyAdvances in Applied Mathematics, 2004
- Consistency conditions upon 3D CT data and the wave equationPhysics in Medicine & Biology, 2002
- A solution to the long-object problem in helical cone-beam tomographyPhysics in Medicine & Biology, 2000
- Quasi-exact filtered backprojection algorithm for long-object problem in helical cone-beam tomographyIEEE Transactions on Medical Imaging, 2000
- Exact cone beam CT with a spiral scanPhysics in Medicine & Biology, 1998
- Mathematical framework of cone beam 3D reconstruction via the first derivative of the radon transformLecture Notes in Mathematics, 1991
- An Inversion Formula for Cone-Beam ReconstructionSIAM Journal on Applied Mathematics, 1983
- The ultrahyperbolic differential equation with four independent variablesDuke Mathematical Journal, 1938