2.1 The 2D solution

In this section, we first discuss the analytical solution to a restricted problem. In the simple setup shown in Fig 1, there are two 3-axis magnetometers located at Point 0 and 1 with x₀ = (0, 0, 0) and x₁ = (L, 0, 0). They together provide six signals (B_0x, B_0y, B_0z) and (B_1x, B_1y, B_1z). The magnetic particle moves on the x-y plane (z = 0), but its magnetic moment is 3D, m = (m_x, m_y, m_z)′. According to the dipole field model, the magnetic field strengths at x₀ and x₁ are , where x is the magnet’s location, n is the normal vector in the x–x_i direction (i = 0 or 1), m is the magnetic moment, and μ₀ is the magnetic permeability. The dipole field is exact for a uniform spherical magnetic bead, and it is a very good approximation for the far field of non-spherical beads [39]. Since x–x_i lies on the x-y plane and n_i = (n_ix, n_iy, 0)′, the magnetic field equation is (1) where the index i is 0 or 1.

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Fig 1. The magnetometer arrangement.

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To calculate m and x, the first step is to eliminate the nonlinear term |x − x_i|³. Generally, the z components (B_z and m_z) are not zero. Thus, we can normalize the x and y equations using the z component and define M = (M_x, M_y)’ = (m_x /m_z, m_y /m_z)’ and T_i = (T_ix, T_iy)’ = (B_ix/B_iz, B_iy/B_iz)′. Hence, T_i = 3n_i(M · n_i) − M. The B_z = 0 case will be discussed later. Define a unit vector t_i in the x-y plane, t_i = (−n_iy, n_ix, 0)′, so t_i is normal to n_i, i.e., t_i · n_i = 0. Now we decompose the vector T_i to the t_i and n_i directions: (2.1) as n is a unit vector, and (2.2)

Substitute the components of each vector, we obtain

If this equation has a non-zero solution, the coefficient matrix must have a zero determinant. Hence,

After rearranging, we get (3)

Note that the values of T components are known and fixed in a measurement, and M is unknown. Eq 3 describes two circles for i = 0 and 1. The radius is and the center is at (–T_ix/4, –T_iy/4), as illustrated in Fig 2.

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Fig 2. Two circles described by Eq 3.

The joints are candidate solutions to M.

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These two circles have two joints, one of which is the solution M. Based on the geometric relationship, we can get two candidate solutions: (4) where and . Here, and E = (T_0xT_1y − T_1xT_0y)/4.

Finally, we need to choose the correct solution from the two possible results. To proceed, selecting one solution M, we can obtain tan θ₀ = (T_0y − M_y)/(T_0x − M_x) and tan θ₁ = (T_1y − M_y)/(T_1x − M_x). Here θ_i is the angle between n_i and the x-axis (Fig 1). Consequently, the magnet’s position is (5.1) (5.2)

Hence, the position x = (x, y, 0)’, and the magnitude |x − x_i|³ can be determined. Thereafter, the z-component equations B_0z = −μ₀m_z/4π|x − x₀|³ and B_1z = −μ₀m_z/4π|x − x₁|³ provide two possible m_z’s with corresponding (m_x, m_y)’ = m_z·M. If the selected M is wrong, the two m_z’s calculated using B_0z and B_1z do not match and this solution should be discarded. In addition, if the magnitude of m is known, we can also determine the correct solution by comparing the magnitude of reconstructed m with the known value.

Now, we discuss the m_z = 0 case. The above reconstruction algorithm can be written briefly as functions x = x(B₀, B₁) and m = m(B₀, B₁). They are finite for any m_z = ± ε, where 0 < ε << 1. As continuous functions that describe a physical trajectory, the left and right limits must be equal, . In other words, the B_0z = B_1z = 0 case is a removable singularity of the function. In real applications, the probability of measuring an exact zero m_z is practically zero, so the above solution works for nearly all measurements.

2.2 From 2D to 3D

The above 2D analytical solution can be generalized to 3D with an arbitrary sensor arrangement. As shown in Fig 3, the magnet is located on the x’-y’ plane, which has a β angle from the X-Y plane in the 3D space. The x’ and X axes overlap. The angle β is regarded as a parameter to be determined later. If we rotate the frame of reference from XYZ to Xy’z’, the 3D reconstruction reduces to the 2D problem. After the rotation, the magnetometer readings become (5)

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Fig 3. The 3D setup and coordinate definition.

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Substituting B’ into the 2D solutions (Eqs 3 and 4), we can reconstruct the status of the magnet with the parameter β: x’ = x’(B’) = f(B, β) and m’ = m’(B’) = g(B, β). Then, the position and moment in the original XYZ frame is (6.1) (6.2)

Finally, we need to determine the parameter β by substituting x and m to the dipole equation. Define , where x and m are functions of B and the unknown parameter β, the dipole equation becomes (7)

On the right hand side, the field strength B is known. Recall that the 2D solution contains two possible results, so the ||B–h|| curves may include two branches, but only one of them reaches zero. Fig 4 shows a sample curve of ||B–h|| as a function of β.

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Fig 4. A sample curve illustrates the relationship between ||B–h|| and β.

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The function h is highly non-linear, but it contains only one variable, as B are known. Therefore, it is actually efficient to solve Eq 7 using Newton’s method in a practical problem, and the reconstructed position in a previous step (a known β) can be used as the initial estimation for the next time step.

For a 3D problem with an arbitrary 3-axis-sensor arrangement (each magnetometer should measure all three components of B), we can apply the above method to any pair of sensors and calculate the averaged reconstruction. In other words, if there are N magnetometers, they form pairs. Each pair produces an x and m. The final reconstruction can be obtained by averaging x and m, which reduces errors in the results. Ideally, the uncertainty decreases as at a large N. This is better than the methods in literature, where the uncertainties scales as . However, the reconstruction speed of our method is lower.

3.1 Trajectory generation and reconstruction

In this section, we will investigate the reconstruction accuracy using synthetic trajectories. The MPT method can be used to study, e.g., fluidization, where collisions among particles can be intense and hard to measure. Therefore, we design the trajectories to contain random turns and sudden velocity changes. Fig 5a shows one sample trajectory section in a 3D space. The domain is a cube with the boundary size L = 0.1 m. One magnetometer is located as the origin and the other is at (L, 0, 0). The directions of the sensors are aligned with the frame of reference (XYZ). This setup has been plotted in Fig 3. Given the trajectory, we can simulate the magnetometer readings using the dipole model. Since real measurements always contain uncertainty, we model the field noise using a Gaussian distribution, where is the ground truth obtained from the synthetic trajectory, and ε is a random variable with zero-mean normal distribution. Here we investigate a series of noise levels, beginning with ε = 0 (no noise) to std(ε) = 0.01, 0.03, 0.05, 0.1, … 0.3, where std means the standard deviation.

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Fig 5.

a) A sample synthetic trajectory that contains sudden velocity changes and turns. The arrows indicate the magnetic moment direction. b) The original and reconstructed positions at various noise levels. The unit of x is meter. c) The ground truth and reconstructed orientations. Here the orientation is normalized using the magnitude |m|. d) The position errors at various noise levels. The error is normalized using the measurement domain size L. e) The orientation errors at different noise levels. The error is normalized using |m|.

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Fig 5b and 5c show a sample of reconstructed position x and orientation m_x. At the zero noise level, our method in Section 2 can reconstruct the position and orientation of a magnet with no error. The zero-noise reconstructed trajectory overlaps the ground truth curve. As the measurement noise increases, the reconstruction error increases. For example, when std(ε) = 0.05, the reconstructed positions deviate from the ground truth significantly. We define the position error as the mean deviation normalized by the measurement domain size, . Fig 5d shows the position error’s dependence on the measurement noise, which is nearly a straight line. For a typical sensor noise level of 3%, the reconstruction error is roughly 3–4% of the domain size, which is consistent with the filtering method [20]. The orientation reconstruction error, defined as , is shown in Fig 5e.

3.2 Propagation of uncertainty

The reconstruction error is highly inhomogeneous in the spatial and orientation domain. This is caused by the propagation of error in the reconstruction. To provide a clear explanation, we differentiate Eq 1, . Written in a matrix format, we have δB = PδV. δB = (δB_0x, δB_0y, δB_0z, δB_1x, δB_1y, δB_1z)′ can be regarded as the measurement noise and δV = (δx, δy, δz, δm_x, δm_y, δm_z)′ is the reconstruction error, where prime means array transpose. The entry in the matrix P is (for j ≤ 3) or (for j ≥ 4), which is a function of x and m reconstructed using the B. Define the invert of P as W = P^–1, we obtain δV = WδB. The position reconstruction error is therefore and the orientation error is where W₁ is the first three rows of W, and W₂ is the 4^th-6^th rows. The maximum ||δx|| can hence be estimated as, (8.1) where σ₁ is the square root of the maximum eigenvalue of . A similar argument shows that the max ||δm|| is (8.2) where σ₂ is the square root of the maximum eigenvalue of . The coefficient σ₁ and σ₂ characterizes the propagation of error in the reconstruction.

To illustrate the spatial distribution of the error propagator, we select a specific case, in which the magnetic moment is |m| = 0.001Am² and it points at the (1, 1, 1) direction. The noise level of B measurements in a L = 0.1 m domain is in the order of micro Tesla (μT). Fig 6 shows σ₁ and σ₂ on a sample plane (z = 0 plane). Note that we present σ₁ and σ₂ with their metric units because the B vary significantly and normalization with one factor can be misleading. The results suggest that there are a few regions with high σ₁ and σ₂ values. Physically, in these regions, the magnetic field strength B are insensitive to at least one component of x or m. As a result, the matrix P becomes nearly singular and the eigenvalues σ₁ and σ₂ become very large. Hence, if the particle trajectory passes through these regions, the uncertainty is larger, which can be manifested as a burst of reconstruction error. In real applications, this error can be removed using more magnetometers in an array.

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Fig 6. The distributions of a) σ₁ and b) σ₂, which characterize the reconstruction error in position and orientation, respectively.

The unit of σ₁ is [mm/μT] and that of σ₂ is [Am²/μT]. Here L = 0.1 m, |m| = 0.001Am² and pointing at the (1, 1, 1) direction.

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4.1 AI- and WT-based denoising method

Two types of DNN structures (i.e., CNN and GRU) are studied for developing the AI-based denoiser. The first proposed denoising method is based on a CNN autoencoder, which contains two 1-D convolutional layers encoding the noisy signal into the latent space and two 1-D deconvolution layers decoding the latent signal to the denoised one after a linear layer. Each convolution/deconvolution layer has a kernel size of 3×1 and stride size of one, followed by a rectified linear unit (ReLU) activation function to account for nonlinearity (more details can be found in Table 1). The convolutional and deconvolutional layers have symmetric parameters such that the output has the same dimension as the input. The noisy trajectory data are fed into the CNN autoencoder with a size of 500×3. The denoised signals can be obtained by the forward evaluation of the network after sufficient training. The second AI-based model uses GRU to preserve the long-term memory of the sequence data. After conducting our preliminary studies on the synthetic data, the GRU is chosen over the LSTM because GRU achieves a close performance to LSTM with less trainable parameters, hence higher efficiency. The DNN within the denoiser starts with two GRU layers stacked together, which convert three channels into nine channels in the hidden layer, and ends with a linear layer that reduces the dimension back to three channels. The input data structure and implementation of the GRU-based model are identical to that in the aforementioned CNN-based model. More details about the GRU parameters can be found in Table 1. Both DNN-based denoisers are implemented in PyTorch, which is an open-source python platform for machine/deep learning.

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Table 1. DNN structure.

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As mentioned, a synthetic dataset of 2000 trajectories is built for training and testing the DNN-based denoiser. The whole dataset contains 2000 samples, each of which has reconstructed results with artificial noise introduced by the synthetic sensor and the corresponding clean signal as ground truth. The datasets are divided into 1800 samples for training and 200 samples for testing. The training dataset is split into mini batches with a size of 200, which is randomly shuffled, for the neural network to update the model parameters in each epoch. Both CNN and GRU models are trained on an NVIDIA GTX2080Ti GPU using the Adam optimizer with a constant learning rate of 0.001. Each training needs at least 1200 epochs to converge, which takes roughly 0.5 hours on the single GPU. For example, the CNN can achieve a root mean square error (RMSE) of 0.0021 after 1200 epochs of training which takes about 0.58 hours.

In addition, a WT denoising method is also developed for comparison purpose, which is based on the discrete wavelet transformation (DWT) described as follow, (9) where X(k) are the DWT coefficients, x(j) and g(j) represent the input signal and wavelet filters respectively, k is the shift coefficient, and C is the scaling factor (normally chosen as 2). The WT model uses VisuShrink [40], which applies a global threshold defined as , where γ and Q denote the noise variance and number of signal elements (or image pixel), respectively. VisuShrink threshold is renowned for its capability of removing Gaussian noise with high probability and therefore widely applied in image denoising problems. Our WT model adopts Coiflet wavelet basis function with wavelet level set to five and uses soft threshold mode. The WT transformation is implemented by using scikit-image [41] in python and applied on the synthetic data regarding each time series as a 1D image. Note that, different from the AI-based denoisers, which require the clean signals as labeled data to learn from, the WT-based denoiser directly rejects noise in the given signal without any labels. However, as mentioned above, the WT-based approaches have difficulties dealing with residual noises, and it is hard to specify appropriate filter banks and suitable hyperparameters that work for all samples.

We define a metric to describe the relative noise strength, referred to as noise level (N), (10) where X_noisy and X_clean represent the noisy and clean signals, respectively. Considering that the noisy signal has large fluctuations of high frequency, a second metric is introduced to evaluate the extent of fluctuation in the following form, (11) where represents the forward finite difference of a time series X. Note that if X represents the velocity, is the acceleration. The performance of a denoising model can be characterized by the signal improvement ratio, (12)

Due to significant noise level in velocity, the signal is plotted in the symmetric pseudo log-scale to resize the continuous real value space of velocity axis, (13) where C determines the lowest resolution of the velocity axis.

4.2 Denoising results

We utilize the above methods to denoise the position, velocity, and orientation of the magnetic particle. The denoiser performance is illustrated using two typical samples in the testing dataset (Figs 7 and 8). The ground truth is also plotted for comparison. The signals in both time and frequency domains are studied to evaluate the degrees of noise reduction and oversmoothing. For the position, all the proposed models provide results in good agreement with the ground truth. AI-based denoising methods display better performance than WT models when handling noise with large magnitude. However, large deviations from the ground truth still exist at some time intervals. The noise level and performance metrics are listed in Table 2. The CNN- and GRU-based algorithms outperform the WT model in terms of noise level, fluctuation level, as well as signal improvement ratio. Moreover, the GRU-based model suppresses both the noise and fluctuation better than the CNN-based model, which can be attributed to the inherent advantage of capturing long-term memory of sequential data. The Fast Fourier Transform (FFT) plots show that both the CNN and GRU-based models can significantly reduce the high-frequency noise of the trajectory signals; however, notable noisy components across the entire frequency domain still remain. In comparison, the WT method suppresses much less high-frequency noises. To further enhance the performance, a hybrid method is developed: first the WT filtering is used to preprocess the signal and reduce the noise, and then the GRU is applied on the filtered results to obtain the final velocity. By combining WT and GRU methods, the hybrid model yields the best denoised trajectory signal with a frequency distribution nearly identical to the ground truth. Hence the hybrid model stands out for denoising the position signal.

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Fig 7. Comparison of the performance of a) CNN, b) GRU, c) WT, d) WT+GRU (hybrid model) on Sample 1 randomly drawn from the testing dataset.

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Fig 8. Comparison of the performance of a) CNN b) GRU c) WT d) WT+GRU (hybrid model) on Sample 2 randomly drawn from the testing dataset.

https://doi.org/10.1371/journal.pone.0254051.g008

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Table 2. Denoising models comparison.

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The magnitude of velocity obtained from the noisy signal is 100 times larger than that of the clean signal. This poses a great challenge to velocity denoising, especially for the AI- based models because the magnitude of the true velocity signal is too small to be distinguished from numerical error. Surprisingly both AI-based models have lower noise and fluctuation levels as shown in Table 2. Figs 7 and 8 rectify our observation by showing that the AI-based models fail to capture the shape of the clean velocity signal in both samples. This indicates that the DNN model alone may not be able to reduce the noise without trimming off the velocity signal, which is a limitation of the neural network approach when directly applied on highly noisy data without any preprocessing (e.g., wavelet filtering). On the other hand, the WT method correctly captures the shape of the clean signal but fails to reduce large fluctuations in certain regions (Figs 7c and 8c). According to Figs 7d and 8d and Table 2, the hybrid model successfully attenuates the velocity fluctuations while retaining the shape of the signal. Note that the trajectories studied here are reconstructed using the 2-sensor setup. The burst of error issue as explained in Section 3.2 exists in these trajectories. Using more magnetic sensors can help completely remove the large fluctuation in certain regions and improve the accuracy. In addition, there still exist discrepancies between the shape of the denoised velocity and the clean signal in certain locations (e.g., the left end of velocity plot in Fig 7d), partially due to the fact that the velocity of synthetic trajectories contains Heaviside step functions. The discrepancies can be improved by modifying the preprocessing algorithm and increasing the depth of the DNN, which requires more training data and longer time. Moreover, it can be observed that the GRU-based model significantly oversmoothes the velocity signals, while the performance of the WT method is case-dependent. For sample 1, the WT model well recovers the frequency distribution at low frequency (<60 Hz), but it significantly deviates from the ground truth at higher frequencies (>60 Hz), indicating poor denoising performance. For sample 2, the WT-denoised result shows a good agreement with the ground truth. The hybrid model, though slightly oversmoothes the velocity signals, outperforms the method by GRU or WT model alone.

In terms of the orientation signal, all proposed models suppress the noise well, among which the CNN-based model has the best denoising performance. Interestingly, the denoising performance of the GRU-based model has been surpassed by the WT model. This is because the overall noise magnitude is small and large noise occasionally spikes up in random locations, which might confuse the GRU from a time sequence point of view. It is worth noting that the hybrid model has the best denoising performance for all variables (positions, velocity, and orientation) compared to AI-based models or the WT model, especially for velocity where a large noise magnitude is present.