Experimental protocol.

The study was performed at the University Medical Center of Schleswig-Holstein, Campus Kiel in Germany. The experiments were carried out on eight anesthetized pigs (body weight (bw): kg, meanstandard deviation (SD)) in supine position. The animals were at first sedated with azaperon (8 mg/kg bw). Anaesthesia was achieved by a continuous intravenous infusion of propofol (6 to 12 mg/kg bw per hour) and sufentanile (10 g/kg bw per hour). Subsequently, the animals were intubated and connected to a ventilator (Siemens Servo 900 C ventilator, Siemens-Elema, Solna, Sweden). Haemodynamic as well as ventilatory parameters including heart rate, partial pressure of CO (Pco₂) in respired gas, arterial O₂ saturation (S_ao₂), airway pressures and respiratory system compliance were continuously monitored using the S/5 anaesthesia monitoring system with a gas-density compensated module (M-CAIOV, Datex Ohmeda, Helsinki, Finland). All animals were ventilated in a volume-controlled mode with a constant V_T, respiratory rate (20 breaths/min) and inspiration-to-expiration ratio of 1∶2 in order to maintain normocapnia (end-tidal Pco₂ 35–45 mmHg). If required, vecuronium bromide (0.1 mg/kg bw) was administered for muscle paralysis to suppress spontaneous breathing activity and thus avoid disturbance of the volume-controlled ventilation measurements.

During the examination period of 60 min, the animals were ventilated with different combinations of end-expiratory pressures and F_Io₂ (Table 2). F_Io₂ was consecutively changed from 21% to 100% and back to 21% and at each F_Io₂, the animals were at first ventilated with zero end-expiratory pressure (ZEEP) and then with Peep of 5 cmH₂O. In each condition, one EIT measurement was performed meaning that a total of six measurements was obtained in each animal.

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Table 2. Lung function and ventilation parameters SD during study period.

https://doi.org/10.1371/journal.pone.0103045.t002

EIT examinations were performed using the Goe-MF II EIT device (CareFusion, Höchberg, Germany). Sixteen self-adhesive electrodes (Blue Sensor BR-50-K, Ambu, Bad Nauheim, Germany) were placed on the chest circumference in one transverse plane lying approximately at the level of the 6th intercostal space. Electrical currents (50 kHz, 5 mArms) were applied through adjacent pairs of electrodes in a rotating mode. After each current injection, the resulting potential differences were measured by the remaining electrode pairs. EIT data were acquired at a frame rate of 13 images/s during 60 s time intervals.

EIT image reconstruction.

The recovery of information about internal conductivity distribution from surface voltage measurements is a severely ill-posed non-linear inverse problem. Time difference EIT (TD-EIT), which compares two sets of measurements, is much less sensitive to uncertainties in electrode placement, thorax geometry and some hardware errors (such as gain variability between channels), than algorithms that attempt to reconstruct the absolute conductivity distribution [42]. This paper considers only TD-EIT algorithms. Specifically, TD-EIT seeks to reconstruct an image of the change in conductivity () between EIT measurements and , where represents the current frame of EIT measurements, while is the reference measurement frame, typically calculated by averaging over periods when conductivity distribution in the region of interest is stable. We use the notation () for time difference data and () for the conductivity change image (or model) . Depending on the image reconstruction approach, the image may be represented as a pixel grid, or on a finite element model (FEM) discretization. Of the many TD-EIT algorithms proposed (see references of [20], [29]) we consider only those that are applicable to the most common case for which clinical and experimental thoracic EIT measurements have been made. Thus, we assume: 1) TD-EIT measurements; 2) placement of 16 EIT electrodes in a single plane around the thorax; 3) measurement performed using adjacent stimulation and measurement (the Sheffield protocol); and 4) reconstruction of images onto a circular domain, since this is a common capability of all algorithms. We organize the space of EIT algorithms as in Fig. 2; first, algorithms are classified on the features used in the forward problem (and sensitivity matrix) and then on the inverse solution. Two main classes of image reconstruction procedures were chosen for analysis, based on backprojection, and sensitivity matrix (FEM) based solutions; the latter category is subdivided into regularization and optimization based methods. We review the formulation of each approach in the following subsections. Clearly, the possible combinations of algorithm variants are very large, and thus difficult to test. Instead, we define a "baseline" algorithm, which represents the simplest approach, and consider modifications from it. For each variation, we define a default case (which is part of ) and a variant case, which is tested in an algorithm (Table 3).

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Figure 2. Taxonomy of direct EIT reconstruction algorithms, classified in terms of the selection of forward and inverse model parameters.

https://doi.org/10.1371/journal.pone.0103045.g002

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Table 3. Algorithm variations considered. For each tested algorithm (horizontal row), the indicated variations from baseline () are made.

https://doi.org/10.1371/journal.pone.0103045.t003

Backprojection sensitivity model.

The backprojection algorithm was developed [43] for the original Sheffield EIT system, and has seen numerous variants and improvements. Using an analogy to X-ray CT backprojection, normalized measurements are "backprojected" onto the equipotential region in the image, and the image is subsequently filtered. Improvements to account for the diffuse nature of electrical current propagation in the body were subsequently made; a good mathematical characterization is given by Santosa and Vogelius [44]. While many variants of Sheffield backprojection () exist, clinical and experimental EIT has largely used only the one which was distributed in the Sheffield Mark I EIT system [45]. In discussions with the algorithm authors, it appears that the exact formulation of this algorithm has been lost. In order to accurately represent this algorithm, we obtained permission to reverse engineer from a Sheffield Mk I device, as described in [29].

Numerical sensitivity model.

The forward model, , in EIT simulates the measured data vector for a given vector of model parameters , as . The data vector, , represents each measured voltage for each applied current pattern in a data frame; for the Sheffield stimulation protocol on 16 electrodes, this yields measurements per frame, of which are independent, due to reciprocity [46]. is typically based on a finite element model (FEM) and each parameter of the conductivity distribution is usually modelled in as the piecewise constant conductivity on a tetrahedral element. The forward model is used to calculate a Jacobian, , or sensitivity matrix, which describes the sensitivity of each data element to each model parameter. (1)where the FEM estimate depends on the background conductivity, , around which the conductivity changes occur. The following section discusses various approaches to numerical (forward) models (), considering the baseline approach and its variants.

Model dimension: 2D FEM / 3D FEM.

The choice of model dimension affects the relative magnitude of measured voltage in regions further from the current stimulations. Real voltage measurements occur in three dimensions, and are thus mismatched to 2D models. Early EIT algorithms used 2D FEM to reduce computational time; however, many recent algorithms continue to use 2D. One consequence is errors in the reconstructed position of objects because sensitivity falls off faster with distance in 3D than 2D.

The baseline model uses a circular 2D FEM (Fig. 3A), and the variant uses a cylindrical 3D FEM of height equal to the medium diameter, and the electrode plane in the centre (Fig. 3B). FEM models are constructed using Netgen [47] by specifying the region geometry and circular electrode contact regions.

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Figure 3. Finite element models used.

Electrode nodes are indicated in green. A: 2D circular uniform FEM () B: 3D cylindrical uniform FEM () C: 3D cylindrical FEM with lung regions () D: 2D circular uniform FEM with electrode movement () (with arrows showing representative electrode movement).

https://doi.org/10.1371/journal.pone.0103045.g003

Difference data: normalized diff. data / diff. data.

TD-EIT defines difference data in terms of the current, , and reference, measurements. The majority of experimental and clinical algorithms (including ) have used normalized difference imaging, where data are defined as . If difference imaging (without normalization) is used, then data are defined as . By normalizing, small measurement values are scaled up, and have a larger impact on the reconstructed images.

The baseline model uses normalized difference data, while the variant model uses difference data (without normalization).

Conductivity background: homogeneous / lung .

TD-EIT assumes conductivity changes occur with respect to a reference conductivity, , which defines the sensitivity matrix, . The most common choice for EIT algorithms is a homogeneous value for , which is clearly a poor model for the thorax, in which the lungs are far less conductive than other tissues. The use of a homogeneous thorax conductivity distorts the position and amplitude of reconstructed contrasts [48].

The baseline model uses a homogeneous (Fig. 3B), while the variant model defines lung tissue with a relative conductivity of of that of other tissues [42]. The lung region is defined from CT images of pigs of similar size to those used in our experiments (Fig. 3C). We evaluate the effect of lung in a 3D FEM, since a full dimensional model is required to get more accurate current flow in the thorax.

Model electrode movement: static model / elec. move.

One key difficulty with EIT measurements is due to the position uncertainty of the electrodes, especially for thoracic measurements, in which the body surface moves during breathing and posture change. Several approaches have been proposed to reduce the effect of electrode movements on the reconstructed EIT conductivity changes. We select the algorithm of [21], [49] based on using an augmented , sensitive to impedance changes, electrode movement, and shape deformation in the model. This approach allows estimation of the shape changes, which we do not use here; instead, by allowing calculation of movement, certain artefacts in the conductivity image may be reduced. This approach can be shown to be equivalent to formulating electrode movement as a structured noise term which is added to the measurement noise variance, . Following [49], (2)where and represent the original and updated estimates of data noise variance, respectively. is the movement sensitivity matrix (change in data for each electrode coordinate change) and is a prior estimate of the covariance of electrode movement.

The baseline model assumes electrode position to be fixed, while the variant model updates noise estimates using (2).

Regularized EIT reconstruction.

The class of linear regularized EIT reconstruction algorithms seeks a solution which minimizes the expression (3)

The first term, is the data error term, the mismatch between the model and the measured data weighted by a matrix , which models the measurement error on each data channel. The data error term has a norm . If a Gaussian model of data errors is used (), the data weighting matrix, , is related to the channel noise covariance, , by . This formulation is also used to incorporate the structured noise due to electrode movement, in (2). The second term, is a regularization term designed to address the ill-conditioning intrinsic to EIT; it serves as a penalty function which "discourages" unlikely (but otherwise feasible) solutions. It calculates the mismatch between the and prior constraints on "likely" models. is the prior mean and has always been set to zero for TD-EIT, since conductivity is as likely to increase as decrease. implements a penalty for large changes or non-smooth conductivities. The model error term has a norm . controls the relative strength of data and model error terms, and is typically called the regularization hyperparameter. As increases, the solution matches more closely to the model, and becomes increasingly smooth. In order to adequately compare different algorithms, functionally equivalent values of are chosen. Many strategies to choose an appropriate value have been presented (see references of [50]). We choose the "Noise Figure" approach [51], in which is chosen such that the ratio of values of signal to noise ratio (SNR) between and is required to be constant across algorithms. Since we have no control of the parameters of the SBP algorithm, all other algorithms are normalized to its value.

The most commonly studied case is for quadratic norms , which has the advantage of modelling Gaussian error, and yielding a closed form, linear solution: (4)

EIT algorithms of this form are known as one-step Gauss Newton solvers (GN) [52]. One important advantage is that image reconstruction can be expressed as matrix multiplication by ; since may be pre-calculated, reconstruction is rapid and may be implemented in real-time. If either or are not quadratic, image reconstruction must be formulated iteratively.

In general, regularized EIT image reconstruction techniques are popular due to their flexibility to represent arbitrary body geometry, measurement configurations, and mathematical models of the conductivity distribution. Many papers have used the basic regularized formulation, and have explored the choices of parameter values. In this paper, the baseline reconstruction algorithm, , follows an early widely used regularized approach, NOSER [52], which makes the following parameter choices: it is quadratic, , data noise is modelled to be identical on each channel , and the regularization matrix, , is diagonal such that, , which implies an assumption that inter-element correlations are zero.

The following section discusses various approaches to regularized image reconstruction (I), considering the baseline approach and its variants.

Data noise model (): uniform / weighted.

The most common approach is to "trust" all EIT data equally, and thus to model each channel with equal, uniform noise (). It is not necessary to set the actual noise intensity, since the data to model noise trade-off is set by the hyperparameter, . In practice, however, EIT noise can vary considerably between data channels, most likely due to variability in electrode contact quality. Such variations in data quality can be addressed by decreasing on channels with larger noise. One practical approach to setting an appropriate is to calculate the reciprocity error [53] (the difference between data values that should be equal by reciprocity [46]) and to use this value to scale . Clearly, modelling data noise would be expected to be more useful for lower quality data; we consider the EIT data in this study to be representative of relatively good measurements.

The baseline model sets , and the variant model sets using the reciprocity error approach [53], setting the parameter . This parameter choice implied data were on average weighted at of their weighting in the baseline model.

Data norm (): Gaussian, /robust, .

As mentioned, a Gaussian () model and data norms allow calculation of a linear matrix inverse. One disadvantage of this formulation is that it emphasizes larger errors (since the effect of an error is squared). One approach to address such errors is the use of a data norm. While such as approach has been relatively recently proposed in medical EIT [54], it has been widely used in the geophysical EIT literature, and is referred to as "robust error norms".

The baseline model uses a Gaussian data norm , while the variant uses using the formulation of [54].

Prior model (): diagonal / smoothing.

The regularization matrix, , is chosen to penalize unlikely solutions. The NOSER [52] regularization matrix is diagonal, and thus penalizes large image amplitudes. Several studies have suggested that a better prior model is a smooth, rather than simply low amplitude distribution [51], [55], [56]. To achieve such smoothing, is designed to penalize non-smooth , imposing a filter across nearby model elements. One key difference between an amplitude and a smoothing filter is its behaviour as a function of model element density. As density increases, amplitude penalties tend to show a more "speckled" pattern of noise, since each image element is independent in this case.

The baseline model sets to penalize image amplitude [52], and the variant model uses the spatial high pass filter [51], in which is calculated to apply Gaussian filter where spatial wavelengths below 10% of the medium diameter are penalized.

Prior model (): diagonal / truncated SVD.

The function of regularization may be understood via the singular value decomposition (SVD) of the Jacobian, , as the pseudo-inverse of , with the elimination of small singular values. Here, and are orthonormal matrices and is diagonal. Thus (5)where

(6)The threshold functions like a regularization parameter. We choose its value to enforce the noise figure constraint similar to the other algorithms. forms a linear inverse and may be represented in the form of (4) with the values (uniform independent noise), a very large value of , and equal to with its first rows set to zero [57].

The baseline model sets to penalize image amplitude [52], and the variant model uses the truncated SVD to set as indicated above.

Model norm (): Gaussian / Total Variation.

One disadvantage of a Gaussian () model norm is that it blurs edges in images, which is physiologically unrealistic, since organ boundaries are anatomically well-defined. This blurring can be addressed using the Total Variation (TV) formulation [58], with . While TV produces apparently sharper images, there is some debate as to whether such images can give the appearance of features where none exist, especially in the context of EIT data errors.

The baseline model uses a Gaussian model , while the variant implements TV using the formulation of [54], [58].

Optimization based EIT reconstruction.

One recent EIT reconstruction algorithm formulation is GREIT [29]. This algorithm proposes an approach to image reconstruction designed to implement a set of requirements (or figures of merit) on which a group of experts reached consensus. The parameters of a linear reconstruction matrix, , are chosen to best satisfy the listed requirements. This approach is similar in many ways to regularized image reconstruction; however it is the reconstruction matrix, , rather than the image, , which is the target in the objective function formulation. Thus, we classify GREIT as an "optimization-based EIT reconstruction". The GREIT approach provides a number of different parameters which can be selected for an image; however, in this paper we choose the circular model reconstruction matrix evaluated in [29].

EIT algorithms evaluated.

In order to test the large variety of possible combinations of EIT reconstruction algorithms, we evaluate a baseline algorithm, , and modifications of it in a single variation. The list of considered algorithms is summarized in Table 3. We thus consider and nine variations, as well as SBP and GREIT, for a total of twelve algorithms.

Image reconstruction.

Each EIT algorithm identified in Table 3 was implemented using EIDORS version 3.6 [30] and used to reconstruct real conductivity change in each EIT frame in each series of EIT scans, representing 60 seconds of recording for each animal and condition. The reference data set, was chosen to be an average of data scans at end-expiration. Images reconstructed onto an FEM were interpolated onto a pixel grid ( and create a pixel image directly).

Modern algorithms can be tuned to control the trade-off between resolution and noise performance, generally via a "hyperparameter". To fairly compare algorithms, it is essential that the individual hyperparameters are set to equivalent values using an objective measure. Several such measures have been proposed [50]. In this study we chose to tune all algorithms such that the noise figure (NF) measure, first proposed for EIT by [51], for changes half the model radius away from the centre was . This particular value was chosen as it matched the performance of the backprojection algorithm, which does not have a tunable hyperparameter.

Ventilation pattern evaluation.

From each sequence of EIT data, an average end-inspiratory and end-expiratory data scan was calculated and used for subsequent analysis. The average data scan was calculated by, first, identifying candidate end-inspiratory (end-expiratory) time points from the maximum (minimum) values in the average time course of EIT data. These candidate points were reviewed by a human operator in order to identify and, if necessary, reject physiologically infeasible time points. An example of identified (and rejected) events is shown in Fig. 4. The remaining points were averaged to create a single data scan, one for end-inspiration and one for end-expiration. Using these data, functional EIT scans were generated showing the distribution of local V_T by plotting the average tidal differences between the end-inspiratory and end-expiratory values in corresponding pixel locations.

Lung areas (A_L) in images were identified as regions with an EIT ventilation signal above of the maximum found in the image. This approach was recommended e.g. in [59]. These were aggregated over all 6 recordings to provide a single lung region of interest (ROI) for each animal and algorithm. The size and shape of the lung ROI varies for different algorithms, since some tend to "squeeze" image contrasts toward the image centre. For each measurement, we calculate V_T by summing all pixel values within the lung ROI; we characterized the distribution of ventilation along the dorsoventral axis within the lung ROI as centre of ventilation (CoV), calculated analogously to centre of gravity, such that CoV in the image centre and positive in non-dependent (ventral) lung regions; . The CoV values depend on the position of the lung ROI within the EIT image. A decrease in CoV reflects a shift of ventilation distribution towards the dependent lung.

Statistical analysis.

Statistical tests are performed as follows: to test for inequality (), we use the one-tailed -test to test rejection of the null hypothesis, ; to test for equality (), we use the two-tailed -test to test rejection of the null hypothesis, for V_T, and for CoV. Thus we consider EIT-derived V_T values equal when their means differ by less than 10%. We treat mean CoV values equal when they differ by less than 0.03, which corresponds to half a pixel height in a image. For each test a value is calculated, and is considered significant.

The -test requires an assumption of a normal distribution of data. We investigated this assumption using two approaches. First, the distribution of each set of calculated parameters was tested against the normal distribution using the Kolmogorov-Smirnov normality test, using . Next, data were analysed using the same protocol, but with the Wilcoxon signed rank test instead of the -test.