The correlation among the channels in parallel MRI detection

In the following, we use the word ‘coil’ to respectively indicate a pickup coil in the ULF-MRI system and a radio-frequency (RF) coil in high-field MRI. Accordingly, a coil array indicates the collection of pickup coils in ULF-MRI and RF coils in high-field MRI. Because the sensitivity map for each channel of a coil array is spatially smooth and distinct, the k-space data from each channel are locally and linearly correlated with data from other channels [5], [12], [13]. Specifically, using d_i(k_m) to denote the complex-valued k-space data at the i^th channel and at k-space coordinate k_m, we have(1)where k_[m] denotes the k-space coordinates in the vicinity of k_m (excluding k_m). p_j are the fitting coefficients with the index j indicating different channels of the coil and neighbors of k_m. Note that the vicinity here is related to the spatial smoothness of the coil sensitivity maps. The formulation above has been used extensively in high-field parallel MRI to increase the spatiotemporal resolution of MRI at the cost of SNR reduction (for a review, see [14]). For example, SMASH replaces the k-space data d_i(k_m) and d_j(k_[m]) with B₁ sensitivity maps and desired spatial harmonic functions to derive the coefficients p_j, which are later used to interpolate the missing k-space data [13]. GRAPPA uses the ‘auto-calibrated scan’ k-space data d_i(k_m) and d_j(k_[m]) to first estimate coefficients p_j, which are then used to multiply the acquired k-space data in order to reconstruct the skipped k-space data [12]. Different from GRAPPA, which uses different k-space kernels to reconstruct data in different k-space lattice structures, SPIRiT is a method that synthesizes missing k-space data by using one single pattern to linearly correlate neighboring k-space data points from all receiver coils [5].

Eq. [1] has a matrix representation(2)where d_i denotes a vector generated from the vertical concatenation of all k-space data points d_i(k_m) in channel i. D is a matrix, each row of which includes the k-space data points d_j(k_[m]) from all RF coils at k-space coordinates k_[m] in the neighborhood of k_m. a_i is a vector including the unknown coefficients. n_c is the number of channels in a coil array.

Suppressing noise using data consistency

Instead of aiming at spatiotemporal resolution enhancement, we use Eq. [2] to enforce data consistency among channels of a coil array at all k-space locations. Without any noise contamination, Eq. [2] describes a linear dependency between a k-space data point and other k-space data points across all channels of a coil array. Specifically, given d_i and D, a_i can be estimated. Let denote the estimate of a_i. We expect that .

To enforce such data consistency practically, we propose to iteratively 1) first estimate the coefficients , and 2) update all k-space data . Specifically, at the p^th iteration with data D^p and d_i^p, we have , where denotes the estimator. Subsequently, we update the data and . The procedure is repeated until convergence .

The estimator can be based on least-squares fitting for computational efficiency.(3)where the superscript H denotes complex conjugate and transpose and denotes the square of the l₂-norm.

In addition, we can incorporate any prior information to estimate regularized coefficients for channel i at an iteration step p.(4)where F denotes the Fourier transform, and T denotes taking the difference between a selected voxel and the average of its neighboring voxels. denotes taking the l₁-norm. λ is a regularization parameter. The cost quantifying the ‘sparsity’ of the image in the transformed domain is closely related to the Total Variation [15], [16].

Eq. [4] was calculated in practice by the iterative re-weighted least-squares algorithm [17], which uses a computationally efficient weighted least-squares estimator with a diagonal weighting matrix changing over iteration to approximate the exact solution of Eq. [4]. Specifically, at the j^th iteration, we have(5)where denotes generating a diagonal matrix from the vector argument. ε is a very small number to avoid divergence. The regularization parameter was determined by , where denotes the trace of a matrix. This is based on our previous studies in regularized parallel MRI reconstructions [18], [19], [20]. The λ used in this study ranged between 0.03 and 0.5.

Ethics Statement

All human images were acquired from subjects with written informed consent under the approval of the Institute Review Board of Aalto University.

Our ULF-MRI system [21] has 47 SQUID sensors distributed over the occipital lobe in a helmet-shaped dewar (Figure 1). The field sensitivity of the sensors was 4 fT/√Hz for magnetometers and ∼4 fT/cm/√Hz for gradiometers. A constant B₀ = 50 µT was applied for magnetization precession along the z direction in Figure 1. The configuration of this system was used for the subsequent simulations and empirical hand and brain imaging.

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Figure 1. A: Our ULF-MRI system, which includes the x-, y-, and z-gradients (orange, red, and blue, respectively) and the magnet to generate the measurement field (green).

The polarizing and excitation coils are not shown in the figure. B: The posterior view of the system shows 47 SQUID sensors covering the posterior parts of the head.

https://doi.org/10.1371/journal.pone.0061652.g001

In the simulation, the ‘true image’ was based on a high-resolution T₁-weighted head MRI acquired from a 3T MRI (Tim Trio, Siemens Medical Solutions, Erlangen, Germany). The data were acquired using a 32-channel head coil array with the MPRAGE pulse sequence (TR/TE/flip = 2530 ms/3.49 ms/7°, partition thickness = 1.0 mm, matrix = 256×256, 256 partitions, FOV = 256 mm×256 mm). One coronal-slice head image through the center of the brain was taken as the ‘true image’, which was then multiplied pixel-by-pixel by the individual coil-sensitivity map calculated by the Biot–Savart law after given the detection-array geometry (Figure 1) in order to simulate the noiseless detection s_i in the i^th channel of the coil array. To simulate acquisitions at different signal-to-noise ratios (SNRs), complex-valued Gaussian white noise n was scaled and then added to each channel of the coil array: SNR = √(s^Hs/n^Hn), where s is a vector consisting of s_i across different channels. We simulated SNR = 0.5, 1, and 2 in this study.

Figure 1 shows the schematic diagram of the ULF-MRI system. Experimental data were acquired using a 3D spin-echo sequence with TE = 80 ms to generate hand images of 6 mm×7.1 mm in-plane resolution (slice thickness 10 mm) using a maximal gradient strength of 85 µT/m. Before each k-space read-out measurement, the sample was polarized in a 22-mT field for 1 s. The total imaging time was 35 minutes. For brain images, we also used a 3D spin-echo sequence with TE = 122 ms, 4 mm×4 mm in-plane resolution (slice thickness 6 mm), and a maximal gradient strength of 130 µT/m. Before each k-space read-out measurement, the sample was polarized in a 22-mT field for 915 ms. The total imaging time was 90 minutes.

We also measured saline phantom images in the brain imaging experiment. This allowed us the estimates of coil sensitivity maps and consequently to use the non-accelerated SENSE MRI reconstruction algorithm [22], [23] with regularization [18], [20], [24] to optimally combine complex-valued coil images. Specifically, the regularization parameter λ was chosen as described in our previous study [21]. For images without sensitivity maps, we calculated the sum-of-squares images as the final reconstruction. To quantify the image quality, we calculate the peak signal-to-noise ratio (pSNR) of the image as the ratio between the largest pixel value and the background noise fluctuation, which was the square root of the mean of the image pixel values outside the imaging object. Since there is no golden standard in the empirical data, we also calculate the mean-square-error (MSE) of the reconstruction with respect to the reconstruction using all available averages. Data were reconstructed with Matlab (Mathworks, Natick, MA, USA) using in-house codes on a PC (two quad-core processors with 16 gigabytes of memory).

Simulations

Figure 2 shows the simulation results of reconstructing sum-of-squares (SoS) images. For comparison, a noiseless SoS reconstruction is also shown. Generally, these results show that the images become less distinguishable as SNR degrades. Using the data consistency constraint alone without any prior (λ = 0), we observed that the residual errors, quantified by the sum of the squares of the difference image between each reconstruction and the noiseless SoS image, decrease at all SNRs. The residual errors are also shown in the lower right corner of each reconstructed image. We also used the prior information of image sparsity to further suppress noise with three λ's (λ = 0.03, 0.1, and 0.5). The λ corresponding to the minimal residual error was found at different SNRs. At SNR = 2, the prior did not help reduce the residual error, because image features of lower intensity, such as the skull and muscles outside brain parenchyma, were also suppressed. At SNR = 1, data consistency constraint shows a smaller residual error. Using the sparsity prior, we found that λ = 0.03 gives the least residual error (approximating the best reconstruction at SNR = 2 with λ = 0) by showing some brain structures and low background noise. At SNR = 0.5, although the data consistency constraint and the prior of image sparsity can reduce the noise, the reconstruction is generally too noisy to discern the actual image features. However, surprisingly, with λ = 0.5, we can still delineate the brain parenchyma, which cannot be recognized in the original SoS and the SoS reconstruction using data consistency constraint alone. Taken together, at SNR>2 the data consistency constraint can suppress the noise. At SNR ∼1, the image can be better reconstructed using both the data consistency constraint and the prior information, assuming the image can be sparsely represented.

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Figure 2. The simulated noiseless sum-of-squares (SoS) image from all 47 channels of the ULF-MRI system (left).

At different SNRs compared to the direct SoS reconstruction, SNR can be improved by incorporating the data consistency constraint (λ = 0). Using the sparsity prior (λ = 0.03, 0.1, and 0.5), the residual error can be further reduced with low SNR acquisitions. The residual errors are reported at the lower-right corner of each reconstruction.

https://doi.org/10.1371/journal.pone.0061652.g002

Hand images

Figure 3 shows experimental images of the right hand of a subject. Without coil sensitivity measurement, we showed the sum-of-squares (SoS) image of five digits and the palm. Notably, there was a clear vertical strip artifact in the SoS image, potentially due to the SQUID noise at 3 kHz in our system. The background noise σ was 0.021. Using the data consistency constraint alone (λ = 0) reduced the vertical strip artifact and the background noise (σ = 0.012) significantly. Applying the data consistency constraint also increased the pSNR from 7.7 to 14.0. Further, the use of the sparsity prior (λ = 0.1) gave a similar reconstructed image as the reconstruction with λ = 0. The pSNR was further improved to 57.6 because of the strong suppression of the background noise.

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Figure 3. A hand sum-of-squares (SoS) image (left).

The data consistency constraint (λ = 0) reduces significantly the noticeable vertical strip artifact (middle). Further, the sparsity prior (λ = 0.1) improves the reconstruction only marginally (right). The pSNR was indicated in each image.

https://doi.org/10.1371/journal.pone.0061652.g003

Brain images

Six coronal slices of brain images from our ULF-MRI system with 22-mT polarization, 130-µT/m maximum gradient, and 90-minute imaging time (eight averages) are shown in Figure. 4. The shapes of the skull and brain parenchyma were observed in the regularized SENSE reconstructions. We found that signals potentially from gray and white matter increased as the data consistency constraint was applied (λ = 0). The average pSNR across six images increased from 11 to 26. Furthermore, when the sparsity constraint was added, the average pSNR dramatically increased to 296. This was due to strong suppression of the background noise. However, applying the sparsity constraint also decreased the image intensity at the FOV center. Figure 5 shows the regularized SENSE reconstruction of slice 4 using data with 1, 2, 4, and 8 averages. The pSNR increased in proportion to the number of averages for the original data. Using the same data, reconstructions that applied the data consistency constraint with λ = 0 had a 2.2-folds pSNR improvement. Specifically, the pSNR of the reconstruction with four averages gave similar pSNR to the reconstruction using unaveraged data with the data consistency constraint. This is similar to the 8-average data and 2-average data with the data consistency constraint. Using the sparsity constraint with λ = 0.01 further improved the pSNR by a factor of 12. However, one should be cautious that a higher pSNR should be further validated by golden standard images if possible. The MSE with respect to the regularized SENSE reconstruction with eight averages were also reported in Figure 5. Similar MSE results can be obtained by either the data consistency constraint or double the measurement time.

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Figure 4. Brain images reconstructed by the regularized SENSE reconstructions with no acceleration (left column).

The data consistency constraint (λ = 0) improves the image by showing a strong signal in the brain parenchyma (middle column). Further, the sparsity prior (λ = 0.1) suppresses the background noise significantly to better delineate the skull and the brain (right column). The pSNR was indicated in each image.

https://doi.org/10.1371/journal.pone.0061652.g004

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Figure 5. A brain image with different number of averages reconstructed by the regularized SENSE reconstruction with no acceleration.

The pSNR (cyan) and MSE (green) were reported in each image.

https://doi.org/10.1371/journal.pone.0061652.g005