Mathematical concepts for image reconstruction in tomography
- Authors
- Kim, S.; Khambampati, A.K.
- Issue Date
- Apr-2015
- Publisher
- Elsevier Inc.
- Keywords
- Algebraic reconstruction technique (ART); Computer tomography; Diffraction tomography; Direct back projection; Dynamic algorithms; Electrical tomography; Filtered back projection; Fourier diffraction theorem; Gradient-based algorithms; Linear algorithms; Time update equations; Tomography; Transmission tomography
- Citation
- Industrial Tomography: Systems and Applications, pp 305 - 346
- Pages
- 42
- Journal Title
- Industrial Tomography: Systems and Applications
- Start Page
- 305
- End Page
- 346
- URI
- https://scholarworks.bwise.kr/cau/handle/2019.sw.cau/55981
- DOI
- 10.1016/B978-1-78242-118-4.00012-5
- ISSN
- 0000-0000
- Abstract
- Tomography gives us the cross-sectional image of the distribution of substances within the domain of interest hence it provides useful information about the actual process. There are different kinds of tomography techniques that are available. Each of them use different mode of energy and therefore have different interaction phenomenon between the penetrating wave and the medium. In this chapter, the mathematical concepts for image reconstruction in three modes of tomography, transmission, electrical and diffusion tomography are discussed. © 2015 Elsevier Ltd. All rights reserved.
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Collections - College of Engineering > School of Energy System Engineering > 1. Journal Articles
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