The use of the least-squares minimal residual algorithm for fast and regularized attenuation compensation in SPECT

“…In SPECT attenuation correction, the minimal residual algorithm (Axelsson 1980) is used for solving the following inverse problem (La et al 1996, La andGrangeat 1998):…”

“…It has been shown that the operators used in the iterative filtered backprojections (Walters et al 1981) are good candidates for the R * operator when using the minimal residual algorithm (La et al 1996, La andGrangeat 1998), but they do not ensure regularization. A spatially adaptative filtering technique has already been proposed for the regularization of MR (La et al 1996, La andGrangeat 1998) and applied to brain (Almeida et al 1997) and cardiac (La and Grangeat 1998) SPECT reconstruction: each estimated activity reconstruction is convolved with a 3D Laplacian kernel and then multiplied by a regularization parameter λ, which differs from one region to another, thus requiring a preliminary segmentation of the images.…”

“…the attenuation is modelled in the projector and not in the backprojector). Unlike the CG algorithm, the MR algorithm does not necessarily converge to a global minimum solution (Axelsson 1980, Greenbaum 1997), yet it has been shown to give similar results to those obtained with CG for attenuation correction in SPECT, using four times fewer iterations (La et al 1996, La andGrangeat 1998). MR presents about the same sensitivity to noise as CG (e.g.…”

A spline-regularized minimal residual algorithm for iterative attenuation correction in SPECT

“…In SPECT attenuation correction, the minimal residual algorithm (Axelsson 1980) is used for solving the following inverse problem (La et al 1996, La andGrangeat 1998):…”

“…It has been shown that the operators used in the iterative filtered backprojections (Walters et al 1981) are good candidates for the R * operator when using the minimal residual algorithm (La et al 1996, La andGrangeat 1998), but they do not ensure regularization. A spatially adaptative filtering technique has already been proposed for the regularization of MR (La et al 1996, La andGrangeat 1998) and applied to brain (Almeida et al 1997) and cardiac (La and Grangeat 1998) SPECT reconstruction: each estimated activity reconstruction is convolved with a 3D Laplacian kernel and then multiplied by a regularization parameter λ, which differs from one region to another, thus requiring a preliminary segmentation of the images.…”

“…the attenuation is modelled in the projector and not in the backprojector). Unlike the CG algorithm, the MR algorithm does not necessarily converge to a global minimum solution (Axelsson 1980, Greenbaum 1997), yet it has been shown to give similar results to those obtained with CG for attenuation correction in SPECT, using four times fewer iterations (La et al 1996, La andGrangeat 1998). MR presents about the same sensitivity to noise as CG (e.g.…”

A spline-regularized minimal residual algorithm for iterative attenuation correction in SPECT

“…The closer P X µ is to the identity matrix within a normalization factor, the faster the convergence rate is. Possible expressions for P are discretized analytical inversion formulae for unattenuated projection data (La et al 1996). System (3) can also be solved using CG.…”

“…The proposed reconstruction method is an algebraic method based on the application of the least-squares (LS) minimal residual (MR) minimization algorithm to a preconditioned system. Unlike conjugate gradient (CG) based reconstruction techniques, the proposed MR-based algorithm solves directly a quasisymmetric linear system (Axelsson 1980, La 1997, La et al 1996. By avoiding the normal equations, it improves the convergence rate.…”

Minimal residual cone-beam reconstruction with attenuation correction in SPECT

Evaluation of two conjugate gradient based algorithms for quantitation in cardiac SPECT imaging