Abstract
Robustness against data inconsistencies, imaging artifacts and acquisition speed are crucial factors limiting the possible range of applications for magnetic resonance imaging (MRI). Therefore, we report a novel calibrationless parallel imaging technique which simultaneously estimates coil profiles and image content in a relaxed forward model. Our method is robust against a wide class of data inconsistencies, minimizes imaging artifacts and is comparably fast, combining important advantages of many conceptually different stateoftheart parallel imaging approaches. Depending on the experimental setting, data can be undersampled well below the Nyquist limit. Here, even high acceleration factors yield excellent imaging results while being robust to noise and the occurrence of phase singularities in the image domain, as we show on different data. Moreover, our method successfully reconstructs acquisitions with insufficient fieldofview. We further compare our approach to ESPIRiT and SAKE using spinecho and gradient echo MRI data from the human head and knee. In addition, we show its applicability to nonCartesian imaging on radial FLASH cardiac MRI data. Using theoretical considerations, we show that ENLIVE can be related to a lowrank formulation of blind multichannel deconvolution, explaining why it inherently promotes lowrank solutions.
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Introduction
Since acquisition speed is a major issue in MRI, accelerated imaging with multiple receiver coils has been an active field of research since its beginning. Quite rapidly, two main categories of parallel imaging methods emerged: imagespace methods, of which sensitivity encoding (SENSE)^{1} is the prototypical example and kspace methods, where it is generalized autocalibrating partially parallel acquisitions (GRAPPA)^{2}. SENSElike methods, when the coil sensitivity profiles are known, permit a natural description as a linear inverse problem. Incorporating the estimation of coil sensitivity profiles into the reconstruction leads to a nonlinear inverse problem, as formulated in Joint Image Reconstruction and Sensitivity Estimation in SENSE (JSENSE)^{3} and Regularized Nonlinear Inversion (NLINV)^{4}.
Additionally, lowrank and subspace methods^{5,6,7,8} have been proposed to further increase reliability and acceleration in MRI. These methods exploit prior knowledge on the structure of the matrices arising in MRI reconstruction. Recently, ESPIRiT^{9} has been shown to provide robustness towards data inconsistencies similar to kspace methods such as GRAPPA^{2}. In particular, in cases where the chosen fieldofview (FOV) is smaller than the object^{10} and in phaseconstraint imaging^{11}, it was shown that methods based on traditional SENSE that only use a single set of coil sensitivity profiles exhibit artifacts. In ESPIRiT, robust reconstruction is possible through a relaxed SENSEmodel, which uses multiple images and sets of coil sensitivity profiles.
ESPIRiT recovers accurate coil sensitivities using an eigenvalue decomposition of an imagedomain operator which projects onto the signal space of the calibration matrix. In case of inconsistencies, it produces multiple sets of maps which can be used in a relaxed SENSE reconstruction. ESPIRiT requires a fullysampled calibration region in the center of kspace. Additionally, it cannot be applied directly to nonCartesian data, requiring an additional gridding step to generate calibration data. A more generic subspace method is SAKE^{5}, because it can be directly applied to data without fullysampled calibration region or nonCartesian data. Based on the idea that the signal is contained in a subspace of smaller dimensionality which can be recovered, SAKE uses structured lowrank matrix completion to recover a full kspace from incomplete data. Unfortunately, it is computationally extremely demanding as each iteration has to perform a singularvalue decomposition (SVD). Furthermore, because it operates completely in kspace, regularization terms may require additional Fourier transforms and must be applied to all channels. Calibrationfree locally lowrank encouraging reconstruction (CLEAR)^{8} is a related method which uses local lowrankness in the image domain instead of the global kspace rank penalty used in SAKE. This reduces the computational complexity by reducing the size of the needed SVDs, although it does increase the number of SVDs necessary. Furthermore, as it is an image space method, regularization can be integrated more easily.
Regularized Nonlinear Inversion (NLINV)^{4} jointly estimates the image content and the coil sensitivity profiles using a nonlinear algorithm. Similar to SAKE, it does not require a fullysampled Cartesian calibration region and can be applied directly to nonCartesian data.
This work aims at combining the advantages from these different methods. Inspired by ESPIRiT, we propose an extension to NLINV that extends it beyond the original SENSElike model. This method, termed ENLIVE (Extended NonLinear InVersion inspired by ESPIRiT), can be related to a convex relaxation of the NLINV problem subject to a lowrank constraint. From NLINV, it inherits its flexibility and suitability for calibrationless and nonCartesian imaging; from ESPIRiT it inherits robustness to data inconsistencies. We apply ENLIVE to several imaging settings covering limited FOV, phase constraints, phase singularities, and nonCartesian acquisition. Additionally, we present comparisons to ESPIRiT and to SAKE.
Initial results have been presented at the 25th Annual Meeting of the International Society for Magnetic Resonance in Medicine^{12}.
Theory
Formulation
NLINV recovers the image m and the coil sensitivity profiles c_{j} from measurements y_{j} by solving the regularized nonlinear optimization problem:
with N_{C} coils, the two or three dimensional Fourier transform \( {\mathcal F} \), the projection \({\mathscr{P}}\) onto the measured trajectory (or the acquired pattern in Cartesian imaging) and an invertible weighting matrix W penalizing high frequencies in the coil profiles. Here, both image \({\boldsymbol{m}}\in {{\mathscr{C}}}^{{n}_{x}\cdot {n}_{y}\cdot {n}_{z}}\) and coils \({{\boldsymbol{c}}}_{j}\in {{\mathscr{C}}}^{{n}_{x}\cdot {n}_{y}\cdot {n}_{z}}\) are regarded as vectors of size \({n}_{x}\cdot {n}_{y}\cdot {n}_{z}=\,:{N}_{I}\) and \(\odot \) is their elementwise product.
In this work, we propose to extend this model to:
where \({{\boldsymbol{c}}}_{j}^{i}\) and m^{i} are k sets of unknown coil sensitivity profiles and unknown images. This approach is inspired by ESPIRiT, which uses additional maps to account for model violations^{9}.
In the following, we will show that this formulation automatically produces solutions with rank even smaller than k if one exits. To show this, we first relate Eq. (2) to a linear inverse problem for matrices with nuclear norm regularization.
From here on, we assume that the variable transformation \({\hat{{\boldsymbol{c}}}}_{j}={\boldsymbol{W}}{{\boldsymbol{c}}}_{j}\) has been applied to move the weighting matrix from the regularization into the forward operator. We note that this problem is equivalent to a corresponding multichannel blind deconvolution problem^{13} in kspace via the convolution theorem. Using the “lifting” approach used for such blind deconvolution problems^{14}, which can also be applied in the image domain, we now lift the Eq. (1) into a linear inverse problem in terms of a rank1 matrix X = uv^{T} formed by the tensor product of u and v, where u corresponds to m and v is a stacked vector composed of the weighted coil sensitivity profiles \({\hat{{\boldsymbol{c}}}}_{j}\). The problem then becomes:
with a linear operator \({\mathscr{A}}\) mapping uv^{T} to \({\mathscr{P}} {\mathcal F} {{\boldsymbol{c}}}_{j}\odot {\boldsymbol{m}}\) and a vector y containing measurement data of all coils. Such an \({\mathscr{A}}\) exists because uv^{T} contains all possible products of elements of u and v. Its explicit action is explained in more detail in the Appendix. In general, all bilinear functions can be expressed as linear functions on the tensor product of the two vector spaces involved.
As suggested by Ahmed et al.^{14} for blind multichannel deconvolution, we now relax the rank1 constraint and allow k sets of images and coil sensitivity profiles. This corresponds to using \({\boldsymbol{X}}={\boldsymbol{U}}{{\boldsymbol{V}}}^{T}\in {{\mathscr{C}}}^{{N}_{I}\times {N}_{C}\cdot {N}_{I}}\) with \({\boldsymbol{U}}\in {{\boldsymbol{C}}}^{{N}_{I}\times k}\) and \({\boldsymbol{V}}\in {{\mathscr{C}}}^{{N}_{C}\cdot {N}_{I}\times k}\), which then leads to the optimization problem
with the Frobenius norm \({\Vert \cdot \Vert }_{F}\). In the Appendix we show how this corresponds to ENLIVE as formulated in Eq. (2). Under conditions given below, Eq. (4) is equivalent to a convex optimization problem for the matrix
with nuclear norm \({\Vert \cdot \Vert }_{\ast }\) regularization^{15,16}. The nuclear norm promotes lowrank solutions. Furthermore, if the solution to Eq. (5) has rank smaller than or equal to k both problems are equivalent in the sense that from a solution U, V of Eq. (4) one obtains a solution of Eq. (5) via X = UV^{T} which attains the same value and from a solution X of Eq. (5) one can construct a solution of Eq. (4) that attains the same value. This is achieved by factorizing X using the SVD and by distributing the singular values in an optimal way, i.e. equally as square roots, to the two factors. Please note that we do not propose to use this convex formulation for computation as it is very expensive, instead we propose to use the nonlinear formulation given in Eq. (2). Nevertheless, this relationship to nuclearnorm regularization is important as it explains why ENLIVE produces solutions with low rank even smaller than k, if one exists.
Implementation
Similar to NLINV^{4}, we solve Eq. (2) using the iteratively regularized GaussNewton method (IRGNM). The IRGNM solves successive linearizations with the regularization parameter decreasing in each Newton step: Starting from α_{0}, the regularizations in each step is reduced according to α_{n} = α_{0}q^{n−1}, 0 < q < 1. As initial guess, we use m^{i} ≡ 1 for the images and \({{\boldsymbol{c}}}_{j}^{i}\equiv 0\) for the coil sensitivity profiles. Because we initialize images and sensitivity profiles for all sets in the same way, the problem is symmetric in the sets and the algorithm will produce degenerate solutions with identical sets. To break this symmetry, we require the k sets of coil profiles to be orthogonal using GramSchmidt orthogonalization after each Newton step. For orthogonalization, the coil profiles of each set are treated as stacked onedimensional vectors.
The weighting matrix W enforcing smoothness in the coil profiles was chosen as in^{4}. In kspace, this leads to a penalty increasing with distance from the center of kspace according to \({\mathrm{(1}+a{\Vert {\boldsymbol{k}}\Vert }^{2})}^{b\mathrm{/2}}\). In this work, a = 240 and b = 40 were used. Furthermore, kspace is normalized so that it extends from −n_{i}/2 to n_{i}/2 for i ∈ {x, y, z}. As W applies weights in kspace, it is the product of a Fourier matrix transforming each coil profile to kspace an of this diagonal weight matrix.
Images and coil profiles are combined in a postprocessing step. This is used to either create individual images for each set i by combining coilweighted images \({{\boldsymbol{m}}}^{i}{{\boldsymbol{c}}}_{j}^{i}\) using
or to create a single combined image by first combining each set to obtain a proper image for each coil and then doing a final coil combination with
Results
Limited FOV
In the examples with a restricted FOV, both ENLIVE with a single set of maps, i.e. NLINV, and ESPIRiT reconstructions show a similar central artifact (Fig. 1). This artifact can be readily explained as a consequence of the undersampling pattern and the signal model violation at the edges of the image: Without a parallel imaging reconstruction, we expect aliasing artifacts from all pixels in the FOV. The parallel imaging reconstruction using a single set of maps can resolve this aliasing only for pixels outside of the regions of model violation. Since these edge regions alias to the image center, the artifact appears there. Both ENLIVE and ESPIRiT reconstructions allowing multiple sets of maps (Figs 1 and 2a) can resolve the aliasing everywhere. For ENLIVE, the coil profiles (Fig. 3) of the second map are sensitive in these regions. For ENLIVE using more than 2 sets of maps, the third and fourth map are close to zero (Fig. 2b). Since no thresholding is used, they cannot be exaclty zero. As is common in parallel imaging, tuning of the regularization is necessary for successful reconstruction: Fig. 4 shows that using too high regularization (too few Newton steps) does not eliminate the central infolding artifact, while too low regularization (too many Newton steps) leads to highfrequency artifacts. Added noise degrades image quality, especially in the case of too low regularization, but does not change the appearance of the infolding artifact. Additionally, Fig. 5 shows that the reconstruction is not sensitive to specific choices for the parameters a and b of the coil weighting matrix W.
Phaseconstrained Imaging
Next, reconstructions for phaseconstrained imaging using virtualconjugate coils with and without an additional partialFourier factor are shown in Fig. 6. In both cases, reconstruction using only a single set of maps exhibit aliasing artifacts. These are a consequence of the realvalue constraint imposed by using virtualconjugate coils together with highfrequency phase variations caused by offresonance from fat: A single realvalued image cannot account for this highfrequency phase, therefore the aliasing cannot be resolved. Relaxing the reconstruction by allowing multiple sets of maps resolves this problem, since the second set of maps can now account for this highfrequency phase variation.
Phase Singularities
Figure 7a shows a phantom example where the initial guess has been intentionally chosen to induce a phase singularity in the reconstruction. The phase singularity leads to signal loss using a single set of maps. Using ENLIVE allowing multiple sets of maps, the affected region can be resolved in the second map. By combining the images, a single image without signal loss can be recovered. This situation can also occur in practice. Figure 7b shows a slice through the throat with large phase variations, while Fig. 7c shows a shortaxis view of the human heart acquired with radial FLASH. Using ENLIVE allowing multiple sets of maps, it is possible to reconstruct artifactfree images.
Lowrank Property
Figures 8 and 9 show calibrationless variabledensity Poissondisc undersampled reconstructions with differing undersampling factors comparing ENLIVE to SAKE. In Fig. 8, both ENLIVE and SAKE provide artifactfree reconstruction for moderate undersampling up to R = 4.0. At R = 7.0, SAKE shows artifacts while ENLIVE is artifact free. For these undersampling factors, the second ENLIVE set image is close to zero, while the first set contains the image. For R = 8.5, both ENLIVE and SAKE show strong artifacts. Additionally, the second ENLIVE map shows some image features. Reconstruction time for R = 4.0 for this dataset using a single core of an Intel Core i54590 CPU was 22 s using ENLIVE and 6.3 h using SAKE. In Fig. 9, ENLIVE and SAKE provide artifactfree reconstruction up to R = 3.0. At R = 5.0, ENLIVE reconstruction is noisy while SAKE shows a large signal void. Reconstruction time for R = 2.0 for this dataset using a single core was 18.6 s using ENLIVE and 41.5 min using SAKE.
Figure 10 shows Cartesian ENLIVE reconstructions of data undersampled using CAIPIRINHA patterns with different undersampling factors. As a reference, the corresponding patterns are shown in the first column. For all undersampling factors, the second map image is close to zero wile the first map contains the entire image. With increasing undersampling, high noise starts to appear in the first map and the combned image. Still, no undersampling artifacts appear even at R = 16. Furthermore, even at this high undersampling, no image features appear in the second map, in contrast to the result in Fig. 8. We conjecture that the adequate calibration region in this datasets prevents that artifact.
Discussion
This work introduces ENLIVE, a nonlinear reconstruction method for parallel imaging using a relaxed forward model. Using the IRGNM, ENLIVE simultaneously estimates multiple sets of images and coil sensitivity profiles, extending NLINV by ESPIRiT’s approach of using multiple sets of maps. The resulting bilinear problem with \({\ell }_{2}\)regularization can be related to a lifted linear formulation using nuclear norm regularization, which promotes lowrank solutions. From this, it becomes apparent that the method, while employing a different parametrization, is similar to SAKE and PLORAKS^{6,7}, which are based on structured lowrank matrix completion in kspace, and to CLEAR^{8}, which locally promotes lowrankness in the image domain. Although the lowrankness of the matrix considered in the kspace methods is also caused by the fact that the signal lives in a subspace spanned by the coil sensitivities^{5,9}, it is constructed from many shifted copies of the signal in kspace. This leads to a huge linear reconstruction problem with a rank constraint. In contrast, CLEAR uses blockwise reconstruction in the image domain, which is more similar to ENLIVE, but still requires a large number of small SVDs. A similar concept has been used to implement other lowrank methods. For example, building on top of the work on object modeling introduced in^{17}, several approaches using annihilating filters have recently been proposed for combining parallel imaging with compressed sensing^{18,19,20,21}. The existence of annihilating filters implies in turn the existence of a weighted lowrank Hankel matrix which can be constructed from the kspace samples. These methods then recover missing samples by structured lowrank matrix completion. In ENLIVE, the convex matrix completion problem has been replaced by a much smaller bilinear problem with simple quadratic penalties^{15,16}. In some sense, this is similar to the idea of transforming linear problems with \({\ell }_{1}\)regularization into quadratic problems with \({\ell }_{2}\)regularization^{22}.
Lowrank approaches have also been proposed for dynamic imaging. One method for blind compressed sensing^{23} estimates both the time series of images as well as a dictionary which sparsifies that series. Haldar and Liang^{24} introduce a method which uses partial separability of the signal into functions describing its kspace and its time dependence. Both of these approaches exploit the low rank of the timedependent signal. While structurally similar, Haldar and Liang^{24} use an explicitly rankconstraint formulation while Lingala et al.^{23} use an \({\ell }_{1}\)norm to induce sparsity. In contrast, ENLIVE’s \({\ell }_{2}\)regularization achieves lowrankness even below its constraint on the maximum rank through the equivalence to a formulation with regularization of the nuclear norm outlined in the Theory, which forms the core of the proposed method.
ENLIVE can also be related to a previous extension of NLINV proposed for separation of chemical species^{25,26}. This method is based on the idea that the signal is a superposition of different images shifted in the spatial domain according to the chemical shift. As also shown for ESPIRiT, the sensitivities for the shifted signals from different species also appear to be shifted. They therefore violate the simple SENSE model with a single set of of maps and, consequently, cause the appearance of a second set of maps. The previously proposed extension to NLINV can be understood as a version of ENLIVE with the additional constraint that different sets of sensitivities are shifted versions of each other.
As shown in this work, small FOV and phaseconstrained reconstructions using a single set of maps show artifacts whenever there are inconsistencies which cannot be explained using the simple model, while ENLIVE allowing two sets of maps enables artifactfree reconstruction in all evaluated cases. When using correct regularization, added noise does not impede artifact removal either. In cases where reconstruction with a single set of maps is already free from artifacts, ENLIVE automatically only uses a single set. In general, though, the maximum number of ENLIVE maps must be specified manually. This is similar to ESPIRiT where, while theoretically the correct number of maps can automatically be estimated as the multiplicity of the eigenvalue 1, in practice a maximum number of maps is set in advance to enable efficient computation of the eigenvector maps by power iteration. However, an extension to ENLIVE to automatically adapt the number of maps during the iteration is also conceivable.
As the distribution of the phase between image and coil sensitivities cannot be determined from the data alone without additional prior knowledge, choosing a good phase is a common problem when calibrating sensitivities^{27,28}. This fundamental problem affects different algorithms in different ways. In Walsh’s method^{29} or ESPIRiT a pixelwise phase across channels simply remains undefined and has to be aligned to a reference. If the reference is not ideal, phase singularities may occur. Phase singularities imply a nonsmooth phase which then reduces sparsity in compressed sensing, preventing an efficient and compact representation of the sensitivities in the Fourier domain^{30}, or causing problems in postprocessing. For example, as Li et al.^{31} have shown, phase singularities can appear as artifactual microhemorrhage in susceptibility weighted imaging. NLINV and ENLIVE guarantee smooth sensitivities, but this then traps the algorithm in a local minimum and creates a hole instead^{32}. For ENLIVE, the use of a second set of maps may still avoid signal loss in the reconstruction.
Even though local minima are a general concern with nonlinear methods, in our experience, the only practically relevant examples are the phase singularities. There, although the ENLIVE reconstruction is not optimal, use of a second map may mitigate the resulting artifact.
Compared to ESPIRiT, ENLIVE is more flexible since it has fewer prerequisites for its use, e.g. no calibration region is necessary. However, in the case of an undersampled Cartesian acquisition with calibration region, ESPIRiT is still to be preferred in most cases because of its speed. Only when faced with a very large number of channels might ESPIRiT lead to longer reconstruction times due to the unfavorable scaling of its SVD with the number of channels.
In summary, ENLIVE combines different advantages of NLINV, ESPIRiT, and SAKE. As NLINV and SAKE, it utilizes all available data, can be directly applied to nonCartesian data, and does not require a calibration region. As ESPIRiT and SAKE, it is not limited to the SENSE model but automatically adapts to certain inconsistencies in the data. As ESPIRiT and NLINV, it is computationally efficient and makes use of an explicit imagedomain representation during reconstruction which facilitates the use of advanced regularization terms.
Conclusion
In this work we propose ENLIVE, a nonlinear method for parallel imaging which seeks to combine the robustness of ESPIRiT with the flexibility of NLINV. ENLIVE can be related to a lifted formulation of blind multichannel deconvolution with nuclear norm regularization, which show that it belongs to the class of calibrationless parallel imaging methods based on structured lowrank matrix completion. In imaging settings involving limited FOV, phase constraints, and phase singularities, it has been shown to provide artifactfree reconstruction with quality comparable to stateoftheart methods.
Methods
The proposed method was implemented in the Berkeley Advanced Reconstruction Toolbox (BART)^{33} and all other reconstructions were performed using BART as well. Processlevel parallelization was achieved using GNU parallel^{34}. To facilitate the reproducibility of our research, data and source code used to generate the results of this paper can be downloaded from https://github.com/mrirecon/enlive.
To test its robustness in case of inconsistencies, ENLIVE was applied in several different experimental settings: We selected examples for imaging with an FOV smaller than the extent of the object, phaseconstrained imaging, and phase singularities. In all cases, reconstructions using ENLIVE were performed using one, i.e. NLINV, or two sets of maps with initial regularization set to α_{0} = 1. If not stated otherwise, 11 Newton steps and q = 1/2 were used for the IRGNM. These parameters, as well as the parameters for the other methods, were chosen according to best visual appearance.
All volunteer imaging for this study was performed with their prior informed written consent, in accordance with the relevant guidelines and regulations, and with the approval of the ethics committee of the University Medical Center Göttingen.
In an example without inconsistencies we tested whether ENLIVE produces results with only one set of maps. Additional examples show ENLIVE’s performance under high undersampling and in nonCartesian imaging.
Limited FOV
We applied ENLIVE to the same dataset used in^{9}. This is a retrospectively 2fold undersampled 2D spinecho dataset (TR/TE = 550/14 ms, FA = 90°, BW = 19 kHz, matrix size: 320 × 168, slice thickness: 3 mm, 24 × 24 calibration region) with an FOV of 200 × 150 mm^{2}, acquired at 1.5 T using an 8channel head coil. The dataset was zeropadded in kspace to produce square image space pixels. This FOV is smaller than the head of the subject in the lateral direction which leads to artifacts in a traditional SENSE reconstruction. These data were reconstructed with ENLIVE using one or two sets of maps and compared to ESPIRiT using one or two sets of maps. To investigate the effect of additional sets of maps, the data were additionally reconstructed using 1, 2, 3, and 4 sets of maps. For ENLIVE, q = 2/3 was used. To investigate the sensitivity to noise and to regularization, an additional reconstruction using 13, 16, 19, 22 and 25 Newton steps and added Gaussian white noise with noise levels of 0%; 0.1%; 1%; 2.5%; 5% was performed. The noise level here is the standard deviation of the added noise as percent of the magnitude of the DC component. From this, 19 Newton steps was determined as the optimum and used for reconstruction. For ESPIRiT a kernel size of 6 × 6 and a threshold of 0.001 was used.
Phaseconstrained Imaging
Phaseconstrained parallel imaging^{35} with virtual conjugate coils^{36} is equivalent to an explicit phase constraint in SENSE, but more robust in GRAPPA and ESPIRiT due to their ability to adapt to inconsistencies^{11,37}. To assess ENLIVE’s performance in phaseconstrained imaging settings with virtual conjugate coils, we applied it to the same dataset used in^{11}. This is a single slice in readout direction of a retrospectively 3fold undersampled 3D FLASH dataset (TR/TE = 11/4.9 ms) acquired at 3 T using a 32channel head coil. 24 × 24 autocalibration lines were used. Additionally, a partial Fourier factor of 5/8 was applied to the data and evaluated separately.
Phase Singularities
Similar to other algorithms^{27,28,32} phase singularities can appear in coil sensitivity profiles with ENLIVE. As ENLIVE enforces smooth coil sensitivity profiles, this leads to an artifactual hole in the sensitivities around the singularity. To demonstrate this effect, we synthetically constructed an example using BART to generate 6channel kspace data (matrix size: 256 × 256) of the numerical SheppLogan phantom. To get ENLIVE trapped in a local minimum with a phase singularity, we provided an initial guess already containing a phase singularity. In regions with rapid phase variation, such phase singularities can also appear in ENLIVE reconstructions of invivo data. A transversal slice through the throat containing such a phase singularity was selected from the same dataset used for phaseconstrained imaging.
To further show that ENLIVE can be applied directly to nonCartesian data, we reconstructed selected data containing a phase singularity from a realtime FLASH^{38} acquisition using a 30 channel thorax coil of a shortaxis view through the heart of a volunteer with no known illnesses (TR/TE = 2.22/1.32 ms, FA = 10°, matrix size: 160 × 160, FOV = 256 × 256 mm^{2}, slice thickness: 6 mm, field strength: 3.0T). Five consecutive frames during diastole, comprising 65 radial spokes, were selected, corrected for gradient delays^{39}, regridded to a 1.5 times finer grid and subsequently reconstructed with ENLIVE using 1 and 2 maps. For this dataset, q = 2/3 and 17 iterations of the IRGNM were used.
Lowrank Property
In order to show that ENLIVE automatically uses only the required number of sets of maps, we retrospectively undersampled the same 3D dataset used for phaseconstrained imaging using variabledensity Poissondisc sampling^{40} with undersampling factors of R = 4.0, 7.0, 8.5 and without a calibration region, and then extracted the same slice in readout direction. As a comparison, these data were also reconstructed using SAKE with 50 iterations and a relative size of the signal subspace of 0.05.
Additionally, we applied SAKE and ENLIVE to a 3D fast spinecho acquisition^{41} of a human knee (TR/TE = 1550/25 ms, FA = 90°, echo train length: 40, matrix size: 320 × 256, FOV = 160 × 153.6 mm^{2}, field strength: 3.0T) from mridata.org^{42}. This dataset was also undersampled using variabledensity Poissondisc sampling with undersampling factors of R = 2, 3, 5 and a single slice in readout direction was extracted. These data were then reconstructed using ENLIVE with 1 and 2 maps and with SAKE with 50 iterations and a relative size of the signal subspace of 0.125.
To evaluate ENLIVE in settings with high acceleration factors, we undersampled the 3D dataset used for phaseconstrained imaging using Cartesian CAIPIRINHA^{43} patterns with undersampling factors of R = 4, 9, 16 with a 24 × 24 calibration region. These data were then reconstructed with ENLIVE using 2 maps with q = 1/3 and 8 iterations of the IRGNM.
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Acknowledgements
Supported by the DZHK (German Centre for Cardiovascular Research). Part of this research was funded by the PhysicstoMedicine Initiative Göttingen (LM der Niedersächsischen Vorab) and DFG (UE 189/11). We acknowledge support by the Open Access Publication Funds of the Göttingen University.
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All authors contributed to the design of the study. H.C.M.H., S.R. and M.U. implemented the method. H.C.M.H. performed the numerical experiments. H.C.M.H., R.N.W. and M.U. contributed to the data analysis. F.O. and M.L. provided guidance on design and implementation. All authors contributed to the preparation of the manuscript.
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Holme, H.C.M., Rosenzweig, S., Ong, F. et al. ENLIVE: An Efficient Nonlinear Method for Calibrationless and Robust Parallel Imaging. Sci Rep 9, 3034 (2019). https://doi.org/10.1038/s41598019398887
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DOI: https://doi.org/10.1038/s41598019398887
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