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Using Low-Rank Tensors for the Recovery of MPI System Matrices

Mirco Grosser, Martin Möddel, Tobias Knopp

2020IEEE Transactions on Computational Imaging23 citationsDOI

Abstract

In Magnetic Particle Imaging (MPI), the system matrix plays an important role, as it encodes the relationship between particle concentration and the measured signal. Its acquisition requires a time-consuming calibration scan, whereas its size leads to a high memory-demand. Both of these aspects can be limiting factors in practice. In order to reduce measurement time, compressed sensing exploits the knowledge that the MPI system matrix has a sparse representation in a suitably chosen domain. In this work we demonstrate that the rows of the system matrix allow a representation as low-rank tensors. We show that such an approximation leads to a denoising of the system matrix while introducing only a negligible bias. As an application, we develop a new matrix recovery method exploiting aforementioned low rank property in addition to sparsity in the DCT domain. Experiments show that the proposed matrix recovery method yields system matrices with reduced error when compared to a standard compressed sensing recovery.

Topics & Concepts

Matrix (chemical analysis)Compressed sensingComputer scienceSparse matrixRank (graph theory)AlgorithmRepresentation (politics)Low-rank approximationRowRow and column spacesDomain (mathematical analysis)Discrete cosine transformMathematicsComputer visionImage (mathematics)Materials sciencePhysicsDatabasePoliticsPolitical scienceQuantum mechanicsComposite materialCombinatoricsGaussianHankel matrixLawMathematical analysisCharacterization and Applications of Magnetic NanoparticlesSparse and Compressive Sensing TechniquesElectrical and Bioimpedance Tomography
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