FOURIER DOMAIN RECONSTRUCTION METHODS WITH APPLICATION TO DIFFRACTION TOMOGRAPHY.

M. Soumekh, M. Kaveh, R. K. Mueller

Research output: Chapter in Book/Report/Conference proceedingConference contribution

9 Scopus citations

Abstract

Presented are algorithms for reconstructing two-dimensional functions from discrete and finite information available about their Fourier transform. The procedure is based upon an interpolation technique in the Fourier domain. The concept is applied to straight-path and diffraction tomography where Fourier domain information is available on a finite number of rotated contours. Finally, the resultant Fourier domain based methods are compared with their corresponding spatial domain based methods, i. e. , filtered backprojection and backpropagation in terms of accuracy of reconstruction and computational efficiency.

Original languageEnglish (US)
Title of host publicationAcoustical Imaging
Subtitle of host publicationProceedings of the International Symposium
PublisherPlenum Press
Pages17-30
Number of pages14
ISBN (Print)0306417170, 9780306417177
DOIs
StatePublished - Jan 1 1984

Publication series

NameAcoustical Imaging: Proceedings of the International Symposium
Volume13
ISSN (Print)0270-5117

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