Open AccessA Note on the Iterative MRI Reconstruction from Nonuniform k‐Space Data
Author(s) -
Tobias Knopp,
Stefan Kunis,
Daniel Potts
Publication year - 2007
Publication title -
international journal of biomedical imaging
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.626
H-Index - 41
eISSN - 1687-4196
pISSN - 1687-4188
DOI - 10.1155/2007/24727
Subject(s) - computer science , discretization , cartesian coordinate system , sampling (signal processing) , fast fourier transform , algorithm , grid , set (abstract data type) , regular grid , scheme (mathematics) , k space , data set , iterative method , data mining , theoretical computer science , fourier transform , mathematics , artificial intelligence , computer vision , mathematical analysis , filter (signal processing) , programming language , geometry
In magnetic resonance imaging (MRI), methods that use a non-Cartesian grid in k -space are becoming increasingly important. In this paper, we use a recently proposed implicit discretisation scheme which generalises the standard approach based on gridding. While the latter succeeds for sufficiently uniform sampling sets and accurate estimated density compensation weights, the implicit method further improves the reconstruction quality when the sampling scheme or the weights are less regular. Both approaches can be solved efficiently with the nonequispaced FFT. Due to several new techniques for the storage of an involved sparse matrix, our examples include also the reconstruction of a large 3D data set. We present four case studies and report on efficient implementation of the related algorithms.
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