Reconstruction of constant concentrations using the system matrix approach
2015
In Magnetic Particle Imaging (MPI) the relation between the measurement signal and the particle distribution can be described by the so-called system matrix [1]. For the 1D case assuming ideal magnetic fields and ideal particles with a step function as magnetization response, the single system function components can be represented by Chebyshev polynomials [2]. In this case, the particle distribution can be reconstructed using a Chebyshev transformation. But since the homogenous part is stored in the excitation frequency component which is filtered out in typical scanner setups, it is not possible to reconstruct a particle distribution which is constant over the area reached by the Field-Free-Point (FFP-area). In this work the reconstruction of a constant particle distribution overlapping the FFP-area using the system matrix approach is evaluated by a 2D simulation study.
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