Source Analysis 3D Imaging
Module information | |
Modules | BESA Research Standard or higher |
Version | 6.1 or higher |
Contents
- 1 Overview
- 2 Multiple Source Beamformer (MSBF)
- 3 Dynamic Imaging of Coherent Sources (DICS)
- 4 CLARA
- 5 LAURA
- 6 LORETA
- 7 sLORETA
- 8 swLORETA
- 9 sSLOFO
- 10 User-Defined Volume Image
- 11 Regularization of distributed volume images
- 12 Cortical LORETA
- 13 Cortical CLARA
- 14 Cortex Inflation
- 15 Surface Minimum Norm Image
- 16 Multiple Source Probe Scan (MSPS)
- 17 Source Sensitivity
Overview
BESA Research features a set of new functions that provide 3D images that are displayed superimposed to the individual subject's anatomy. This chapter introduces these different images and describe their properties and applications.
The 3D images can be divided into three categories:
Volume images:
- The Multiple Source Beamformer (MSBF) is a tool for imaging brain activity. It is applied in the time-domain or time-frequency domain. The beamformer technique in time-frequency domain can image not only evoked, but also induced activity, which is not visible in time-domain averages of the data.
- Dynamic Imaging of Coherent Sources (DICS) can find coherence between any two pairs of voxels in the brain or between an external source and brain voxels. DICS requires time-frequency-transformed data and can find coherence for evoked and induced activity.
The following imaging methods provide an image of brain activity based on a distributed multiple source model:
- CLARA is an iterative application of LORETA images, focusing the obtained 3D image in each iteration step.
- LAURA uses a spatial weighting function that has the form of a local autoregressive function.
- LORETA has the 3D Laplacian operator implemented as spatial weighting prior.
- sLORETA is an unweighted minimum norm that is standardized by the resolution matrix.
- swLORETA is equivalent to sLORETA, except for an additional depth weighting.
- SSLOFO is an iterative application of standardized minimum norm images with consecutive shrinkage of the source space.
- A User-defined volume image allows to experiment with the different imaging techniques. It is possible to specify user-defined parameters for the family of distributed source images to create a new imaging technique.
- Bayesian source imaging: SESAME uses a semi-automated Bayesian approach to estimate the number of dipoles along with their parameters.
Surface image:
- The Surface Minimum Norm Image. If no individual MRI is available, the minimum norm image is displayed on a standard brain surface and computed for standard source locations. If available, an individual brain surface is used to construct the distributed source model and to image the brain activity.
- Cortical LORETA. Unlike classical LORETA, cortical LORETA is not computed in a 3D volume, but on the cortical surface.
- Cortical CLARA. Unlike classical CLARA, cortical CLARA is not computed in a 3D volume, but on the cortical surface.
Discrete model probing:
These images do not visualize source activity. Rather, they visualize properties of the currently applied discrete source model:
- The Multiple Source Probe Scan (MSPS) is a tool for the validation of a discrete multiple source model.
- The Source Sensitivity image displays the sensitivity of a selected source in the current discrete source model and is therefore data independent.
Multiple Source Beamformer (MSBF)
Short mathematical introduction
The BESA beamformer is a modified version of the linearly constrained minimum variance vector beamformer in the time-frequency domain as described in Gross et al., "Dynamic imaging of coherent sources: Studying neural interactions in the human brain", PNAS 98, 694-699, 2001. It allows to image evoked and induced oscillatory activity in a user-defined time-frequency range, where time is taken relative to a triggered event.
The computation is based on a transformation of each channel's single trial data from the time domain into the time-frequency domain. This transformation is performed by the BESA Research Source Coherence module and leads to the complex spectral density Si (f,t), where i is the channel index and f and t denote frequency and time, respectively. Complex cross spectral density matrices C are computed for each trial:
[math]\mathrm{C}_{ij}\left( f,t \right) = \mathrm{S}_{i}\left( f,t \right) \cdot \mathrm{S}_{j}^{*}\left( f,t \right)[/math]
The output power P of the beamformer for a specific brain region at location r is then computed by the following equation:
[math]\mathrm{P}\left( r \right) = \operatorname{tr^{'}}\left\lbrack \mathrm{L}^{T}\left( r \right) \cdot \mathrm{C}_{r}^{-1} \cdot \mathrm{L}\left( r \right) \right\rbrack^{-1}[/math]
Here, Cr-1 is the inverse of the SVD-regularized average of Cij(f,t) over trials and the time-frequency range of interest; L is the leadfield matrix of the model containing a regional source at target location r and, optionally, additional sources whose interference with the target source is to be minimized; tr'[] is the trace of the [3×3] (MEG:[2×2]) submatrix of the bracketed expression that corresponds to the source at target location r.
In BESA Research, the output power P(r) is normalized with the output power in a reference time-frequency interval Pref(r). A value q ist defined as follows:
[math] \mathrm{q}\left( r \right) =
\begin{cases}
\sqrt{\frac{\mathrm{P}\left( r \right)}{\mathrm{P}_{\text{ref}}(r)}} - 1 = \sqrt{\frac{\operatorname{tr^{'}}\left\lbrack \mathrm{L}^{T}\left( r \right) \cdot \mathrm{C}_{r}^{- 1} \cdot \mathrm{L}\left( r \right) \right\rbrack^{- 1}}{\operatorname{tr^{'}}\left\lbrack \mathrm{L}^{T}\left( r \right) \cdot \mathrm{C}_{\text{ref},r}^{- 1} \cdot \mathrm{L}\left( r \right) \right\rbrack^{- 1}}} - 1, & \text{for }\mathrm{P}(r) \geq \mathrm{P}_{\text{ref}}(r) \\
1 - \sqrt{\frac{\mathrm{P}_{\text{ref}}\left( r \right)}{\mathrm{P}\left( r \right)}} = 1 - \sqrt{\frac{\operatorname{tr^{'}}\left\lbrack \mathrm{L}^{T}\left( r \right) \cdot \mathrm{C}_{\text{ref},r}^{- 1} \cdot \mathrm{L}\left( r \right) \right\rbrack^{- 1}}{\operatorname{tr^{'}}\left\lbrack \mathrm{L}^{T}\left( r \right) \cdot \mathrm{C}_{r}^{- 1} \cdot \mathrm{L}\left( r \right) \right\rbrack^{- 1}}}, & \text{for }\mathrm{P}(r) \lt \mathrm{P}_{\text{ref}}(r)
\end{cases} [/math]
Pref can be computed either from the corresponding frequency range in the baseline of the same condition (i.e. the beamformer images event-related power increase or decrease) or from the corresponding time-frequency range in a control condition (i.e. the beamformer images differences between two conditions). The beamformer image is constructed from values q(r) computed for all locations on a grid specified in the General Settings tab. For MEG data, the innermost grid points within a sphere of approx. 12% of the head diameter are assigned interpolated rather than calculated values).
q-values are shown in %, where
[math]\mathrm{q}\left\lbrack \text{%} \right\rbrack = \mathrm{q} \times 100.[/math]
Alternatively to the definition above, q can also be displayed in units of dB:
[math]\mathrm{q}\left\lbrack \text{dB} \right\rbrack = 10 \cdot \log_{10}\frac{\mathrm{P}\left( r \right)}{\mathrm{P}_{\text{ref}}\left( r \right)}[/math]
A beamformer operator is designed to pass signals from the brain region of interest r without attenuation, while minimizing interference from activity in all other brain regions. Traditional single-source beamformers are known to mislocalize sources if several brain regions have highly correlated activity. Therefore, the BESA beamformer extends the traditional single-source beamformer in order to implicitly suppress activity from possibly correlated brain regions. This is achieved by using a multiple source beamformer calculation that contains not only the leadfields of the source at the location of interest r, but also those of possibly interfering sources. As a default, BESA Research uses a bilateral beamformer, where specifically contributions from the homologue source in the opposite hemisphere are taken into account (the matrix L thus being of dimension N×6 for EEG and N×4 for MEG, respectively, where N is the number of sensors). This allows for imaging of highly correlated bilateral activity in the two hemispheres that commonly occurs during processing of external stimuli.
In addition, the beamformer computation can take into account possibly correlated sources at arbitrary locations that are specified in the current solution. This is achieved by adding their leadfield vectors to the matrix L in the equation above.
Applying the Beamformer
This chapter illustrates the usage of the BESA beamformer. The displayed figures are generated using the file 'Examples/Learn-by-Simulations/AC-Coherence/AC-Osc20.foc' (see BESA Tutorial 6: "Tutorial on source coherence").
Starting the beamformer from the time-frequency window
The BESA beamformer is applied in the time-frequency domain and therefore requires the Source Coherence module to be enabled. The time-frequency beamformer is especially useful to image in- or decrease of induced oscillatory activity. Induced activity cannot be observed in the averaged data, but shows up as enhanced averaged power in the TSE (Temporal-Spectral Evolution) plot. For instructions on how to initiate a beamformer computation in the time-frequency window, please refer to Chapter How to Create Beamformer Images.
After the beamformer computation has been initiated in the time-frequency window, the source analysis window opens with an enlarged 3D image of the q-value computed with a bilateral beamformer. The result is superimposed onto the MR image assigned to the data set (individual or standard).
Beamformer image after starting the computation in the Time-Frequency window. A bilateral pair of sources in the auditory cortex accounts for the highly correlated oscillatory induced activity. Only the bilateral beamformer manages to separate these activities; a traditional single-source beamformer would merge the two sources into one image maximum in the head center instead.
Multiple source beamformer in the Source Analysis window
The 3D imaging display is part of the source analysis window. If you press the Restore button at the right end of the title bar of the 3D window, the window appears at the bottom right of the source analysis window. In the channel box, the averaged (evoked) data of the selected condition is shown. When a control condition was selected, its average is appended to the average of the target condition.
Source Analysis window with beamformer image. The two sources have been added using the Switch to Maximum and Add Source toolbar buttons (see below). Source waveforms are computed from the displayed averaged data. Therefore, they do not represent the activity displayed in the beamformer image, which in this simulation example is induced (i.e. not phase-locked to the trigger)!
When starting the beamformer from the time-frequency window, a bilateral beamformer scan is performed. In the source analysis window, the beamformer computation can be repeated taking into account possibly correlated sources that are specified in the current solution. Interfering activities generated by all sources in the current solution that are in the 'On' state are specifically suppressed (they enter the matrix L in the beamformer calculation, see Chapter Short mathematical description above). The computation can be started from the Image menu or from the Image selector button dropdown menu. The Image menu can be evoked either from the menu bar or by right-clicking anywhere in the source analysis window.
Multiple source beamformer image calculated in the presence of a source in the left hemisphere. A single source scan has been performed. The source set in the current solution accounts for the left-hemispheric q-maximum in the data. Accordingly, the beamformer scan reveals only the as yet unmodeled additional activity in the right hemisphere (note the radiological convention in the 3D image display).
The beamformer scan can be performed with a single or a bilateral source scan. The default scan type depends on the current solution:
- When the beamformer is started from the Time-Frequency window, the Source Analysis window opens with a new solution and a bilateral beamformer scan is performed.
- When the beamformer is started within the Source Analysis window, the default is
- a scan with a single source in addition to the sources in the current solution, if at least one source is active.
- a bilateral scan if no source in the current solution is active.
The default scan type is the multiple source beamformer. The non-default scan type can be enforced using the corresponding Volume Image / Beamformer entry in the Image menu.
Inserting Sources out of the Beamformer Image
The beamformer image can be used to add sources to the current solution. A simple double-click anywhere in the 2D- or 3D-view will generate a non-oriented regional source at the corresponding location. However, a better and easier way to create sources at image maxima and minima is to use the toolbar buttons Switch to Maximum and Add Source .
Use the Switch to Maximum button to place the red crosshair of the 3D window onto a local image maximum or minimum. Hitting the Add Source button creates a regional source at the location of the crosshair and therefore ensures the exact placement of the source at the image extremum. Moreover, the Add Source button generates an oriented regional source. BESA Research automatically estimates the source orientation that contributes most to the power in the target time-frequency interval (or the reference time-frequency interval, if its power is larger than that in the target interval). The accuracy of this orientation estimate depends largely on the noise content of the data. The smaller the signal-to-noise ratio of the data, the lower is the accuracy of the orientation estimate. This feature allows to use the beamformer as a tool to create a source montage for source coherence analysis, where it is of advantage to work with oriented sources.
Notes:
- You can hide or re-display the last computed image by selecting the corresponding entry in the Image menu.
- The current image can be exported to ASCII or BrainVoyager vmp-format from the Image menu.
- For scaling options, use the and Image Scale toolbar buttons.
- Parameters used for the beamformer calculations can be set in the General Settings tab of the Image Settings dialog box.
Dynamic Imaging of Coherent Sources (DICS)
Short mathematical introduction
Dynamic Imaging of Coherent Sources (DICS) is a sophisticated method for imaging cortico-cortical coherence in the brain, or coherence between an external reference (e.g. EMG channel) and cortical structures. DICS can be applied to localize evoked as well as induced coherent cortical activity in a user-defined time-frequency range.
DICS was implemented in BESA closely following Gross et al., "Dynamic imaging of coherent sources: Studying neural interactions in the human brain", PNAS 98, 694-699, 2001.
The computation is based on a transformation of each channel's single trial data from the time domain into the frequency domain. This transformation is performed by the BESA Research Coherence module and results in the complex spectral density matrix that is used for constructing the spatial filter similar to beamforming.
DICS computation yields a 3-D image, each voxel being assigned a coherence value. Coherence values can be described as a neural activity index and do not have a unit. The neural activity index contrasts coherence in a target time-frequency bin with coherence of the same time-frequency bin in a baseline.
DICS for cortico-cortical coherence is computed as follows:
Let L(r) be the leadfield in voxel r in the brain and C the complex cross-spectral density matrix. The spatial filter W(r) for the voxel r in the head is defined as follows:
[math]W\left( r \right) = \left\lbrack L^{T}\left( r \right) \cdot C^{- 1} \cdot L\left( r \right) \right\rbrack^{- 1} \cdot L^{T}(r) \cdot C^{- 1}[/math]
The cross-spectrum between two locations (voxels) r1 and r2 in the head are calculated with the following equation:
[math]C_{s}\left( r_{1},r_{2} \right) = W\left( r_{1} \right) \cdot C \cdot W^{*T}\left( r_{2} \right),[/math]
where *T means the transposed complex conjugate of a matrix. The cross-spectral density can then be calculated from the cross spectrum as follows:
[math]c_{s}\left( r_{1},r_{2} \right) = \lambda_{1}\left\{ C_{s}\left( r_{1},r_{2} \right) \right\},[/math]
where λ1{} indicates the largest singular value of the cross spectrum. Once the cross spectral density is estimated, the connectivity¹(CON) between the two brain regions r1 and r2 are calculated as follows:
[math]\text{CON}\left( r_{1},r_{2} \right) = \frac{c_{s}^{\text{sig}}\left( r_{1},r_{2} \right) - c_{s}^{\text{bl}}(r_{1},r_{2})}{c_{s}^{\text{sig}}\left( r_{1},r_{2} \right) + c_{s}^{\text{bl}}(r_{1},r_{2})},[/math]
where cssig is the cross-spectral density for the signal of interest between the two brain regions r1 and r2, and csbl is the corresponding cross spectral density for the baseline or the control condition, respectively. In the case DICS is computed with a cortical reference, r1 is the reference region (voxel) and remains constant while r2 scans all the grid points within the brain sequentially. In that way, the connectivity between the reference brain region and all other brain regions is estimated. The value of CON(r1, r2) falls in the interval [-1 1]. If the cross-spectral density for the baseline is 0 the connectivity value will be 1. If the cross-spectral density for the signal is 0 the connectivity value will be -1.
¹ Here, the term connectivity is used rather than coherence, as strictly speaking the coherence equation is defined slightly differently. For simplicity reasons the rest of the tutorial uses the term coherence.
DICS for cortico-muscular coherence is computed as follows:
When using an external reference, the equation for coherence calculation is slightly different compared to the equation for cortico-cortical coherence. First of all, the cross-spectral density matrix is not only computed for the MEG/EEG channels, but the external reference channel is added. This resulting matrix is Call. In this case, the cross-spectral density between the reference signal and all other MEG/EEG
channels is called cref. It is only one column of Call. Hence, the cross-spectrum in voxel r is calculated with the following equation:
[math]C_{s}\left( r \right) = W\left( r \right) \cdot c_{\text{ref}}[/math]
and the corresponding cross-spectral density is calculated as the sum of squares of Cs:
[math]c_{s}\left( r \right) = \sum_{i = 1}^{n}{C_{s}\left( r \right)_{i}^{2}},[/math]
where n is 2 for MEG and 3 for EEG. This equation can also be described as the squared Euclidean norm of the cross-spectrum:
[math]c_{s}\left( r \right) = \left\| C_{s} \right\|^{2},[/math]
The power in voxel r is calculated as in the cortico-cortical case:
[math]p\left( r \right) = \lambda_{1}\left\{ C_{s}(r,r) \right\}.[/math]
At last, coherence between the external reference and cortical activity is calculated with the equation:
[math]\text{CON}\left( r \right) = \frac{c_{s}(r)}{p\left( r \right) \cdot C_{\text{all}}(k,k)},[/math]
where Call(k, k) is the (k,k)-th diagonal element of the matrix Call.
DICS is particularly useful, if coherence is to be calculated without an a-priory source model (in contrast to source coherence based on pre-defined source montages). However, the recommended analysis strategy for DICS is to use a brain source as a starting point for coherence calculation that is known to contribute to the EEG/MEG signal of interest. For example, one might first run a beamformer on the time-frequency range of interest and use the voxel with the strongest oscillatory activity as a starting point for DICS. The resulting coherence image will again lead to several maxima (ordered by magnitude), which in turn can serve as starting points for DICS calculation. This way, it is possible to detect even weak sources that show coherent activity in the given time-frequency range.
The other significant application for DICS is estimating coherence between an external source and voxels in the brain. For example, an external source can be muscle activity recoded by an electrode placed over the according peripheral region. This way, the direct relationship between muscle activity and brain activation can be measured.
Starting DICS computation from the Time-Frequency Window
DICS is particularly useful, if coherence in a user-defined time-frequency bin (evoked or induced) is to be calculated between any two brain regions or between an external reference and the brain. DICS runs only on time-frequency decomposed data, so time-frequency analysis needs to be run before starting DICS computation.
To start the DICS computation, left-drag a window over a selected time-frequency bin in the Time-Frequency Window. Right-click and select “Image”. A dialogue will open (see fig. 1) prompting you to specify time and frequency settings as well as the baseline period. It is recommended to use a baseline period of equal length as the data period of interest. Make sure to select “DICS” in the top row and press “Go”.
Next, a window will appear allowing you to specify the reference source for coherence calculation (see fig. 2). It is possible to select a channel (e.g. EMG) or a brain source. If a brain source is chosen and no source analysis was computed beforehand, the option “Use current cross-hair position” must be chosen. In case discrete source analysis was computed previously, the selected source can be chosen as the reference for DICS. Please note that DICS can be re-computed with any cross-hair or source position at a later stage.
Confirming with “OK” will start computation of coherence between the selected channel/voxel and all other brain voxels. In case DICS is computed for a reference source in the brain, it can be advantageous to run a beamforming analysis in the selected time-frequency window first and use one of the beamforming maxima as reference for DICS. Fig. 3 shows an example for DICS calculation.
Coherence values range between -1 and 1. If coherence in the signal is much larger than coherence in the baseline (control condition) then the DICS value is going to approach 1. Contrary, if coherence in the baseline is much larger than coherence in the signal, then the DICS value is going to approach -1. At last, if coherence in the signal is equal to coherence in the baseline, then the DICS value is 0.
In case DICS is to be re-computed with a different reference, simply mark the desired reference position by placing the cross-hair in the anatomical view and select “DICS” in the middle panel of the source analysis window (see Fig. 4). In case an external reference is to be selected, click on “DICS” in the middle panel to bring up the DICS dialogue (see. Fig. 2) and select the desired channel. Please note that DICS computation will only be available after running time-frequency analysis.
CLARA
CLARA ('Classical LORETA Analysis Recursively Applied') is an iterative application of weighted LORETA images with a reduced source space in each iteration.
In an initialization step, a LORETA image is calculated. Then in each iteration the following steps are performed:
- The obtained image is spatially smoothed (this step is left out in the first iteration).
- All grid points with amplitudes below a threshold of 1% of the maximum activity are set to zero, thus being effectively eliminated from the source space in the following step.
- The resulting image defines a spatial weighting term (for each voxel the corresponding image amplitude).
- A LORETA image is computed with an additional spatial weighting term for each voxel as computed in step 3. By the default settings in BESA Research, the regularization values used in the iteration steps are slightly higher than that of the initialization LORETA image.
The procedure stops after 2 iterations, and the image computed in the last iteration is displayed. Please note that you can change all parameters by creating a user-defined volume image.
The advantage of CLARA over non-focusing distributed imaging methods is visualized by the figure below. Both images are computed from the N100 response in an auditory oddball experiment (file Oddball.fsg in subfolder fMRI+EEG-RT-Experiment of the Examples folder). The CLARA image is much more focal than the sLORETA image, making it easier to determine the location of the image maxima.
Notes:
- Starting CLARA: CLARA can be started from the Image menu or from the Image Selection button.
- Please refer to Chapter Regularization of distributed volume images for important information on regularization of distributed inverses.
LAURA
LAURA (Local Auto Regressive Average) belongs to the distributed inverse method of the family of weighted minimum norm methods (Grave de Peralta Menendeza et al., "Noninvasive Localization of Electromagnetic Epileptic Activity. I. Method Descriptions and Simulations", BrainTopography 14(2), 131-137, 2001). LAURA uses a spatial weighting function that includes depth weighting and that term has the form of a local autoregressive function.
The source activity is estimated by applying the general formula for a weighted minimum norm:
[math]\mathrm{S}\left( t \right) = \mathrm{V} \cdot \mathrm{L}^{T}\left( \mathrm{L} \cdot \mathrm{V} \cdot \mathrm{L}^{T} \right)^{- 1} \cdot \mathrm{D}(t)[/math]
Here, L is the leadfield matrix of the distributed source model with regional sources distributed on a regular cubic grid. D(t) is the data at time point t. The term in parentheses is generally regularized. Regularization parameters can be specified in the Image Settings.
In LAURA, V contains both a depth weighting term W and a representation of a local autoregressive function A. V is computed as:
[math]\mathrm{V} = \left( \mathrm{U}^{T} \cdot \mathrm{U} \right)^{-1}[/math]
Where
[math]\mathrm{U} = \left( \mathrm{W} \cdot \mathrm{A} \right) \otimes \mathrm{I}_{3}[/math]
Here, [math]\otimes[/math] denotes the Kronecker product. I3 is the [3×3] identity matrix. W is an [s×s] diagonal matrix (with s the number of source locations on the grid), where each diagonal element is the inverse of the maximum singular value of the corresponding regional source's leadfields. The formula for the diagonal components Aii and the off-diagonal components Aik are as follows:
[math]\mathrm{A}_{ii} = \frac{26}{\mathrm{N}_{i}}\sum_{k \subset V_{i}}^{}\frac{1}{\mathrm{d}_{ik}^{2}}[/math]
[math] \mathrm{A}_{ik} = \begin{cases} - 1/\operatorname{dist}\left( i,k \right)^{2}, & \text{if } k \subset V_{i} \\ 0, & \text{otherwise} \end{cases} [/math]
Here, Vi is the vicinity around grid point i that includes the 26 direct neighbors.
The LAURA image in BESA Research displays the norm of the 3 components of S at each location r. Using the menu function Image / Export Image As... you have the option to save this norm of S or alternatively all components separately to disk.
Notes:
- Grid spacing: Due to memory limitations, LAURA images require a grid spacing of 7 mm or more.
- Computation time: Computation speed during the first LAURA image calculation depends on the grid spacing (computation is faster with larger grid spacing). After the first computation of a LAURA image, a *.laura file is stored in the data folder, containing intermediate results of the LAURA inverse. This file is used during all subsequent LAURA image computations. Thereby, the time needed to obtain the image is substantially reduced.
- MEG: In the case of MEG data, an additional constraint is implemented in the LAURA algorithm that prevents solutions from containing radial source currents (compare Pascual-Marqui, ISBET Newsletter 1995, 22-29). In MEG, an additional source space regularization is necessary in the inverse matrix operation required compute V
- Starting LAURA: LAURA can be started from the Image menu or from the Image Selection button.
- Regularization: Please refer to Chapter “Regularization of distributed volume images” for important information on regularization of distributed inverses.
LORETA
LORETA ("Low Resolution Electromagnetic Tomography") is a distributed inverse method of the family of weighted minimum norm methods. LORETA was suggested by R.D. Pascual-Marqui (International Journal of Psychophysiology. 1994, 18:49-65). LORETA is characterized by a smoothness constraint, represented by a discrete 3D Laplacian.
The source activity is estimated by applying the general formula for a weighted minimum norm:
[math]\mathrm{S}\left( t \right) = \mathrm{V} \cdot \mathrm{L}^{T}\left( \mathrm{L} \cdot \mathrm{V} \cdot \mathrm{L}^{T} \right)^{- 1} \cdot \mathrm{D}(t)[/math]
Here, L is the leadfield matrix of the distributed source model with regional sources distributed on a regular cubic grid. D(t) is the data at time point t. The term in parentheses is generally regularized. Regularization parameters can be specified in the Image Settings.
In LORETA, V contains both a depth weighting term and a representation of the 3D Laplacian matrix. V is computed as:
[math]\mathrm{V} = \left( \mathrm{U}^{T} \cdot \mathrm{U} \right)^{- 1}[/math]
where
[math]\mathrm{U} = \left( \mathrm{W} \cdot \mathrm{A} \right) \otimes \mathrm{I}_{3}[/math]
Here, [math]\otimes[/math] denotes the Kronecker product. I3 is the [3x3] identity matrix. W is an [sxs] diagonal matrix (with s the number of source locations on the grid), where each diagonal element is the inverse of the maximum singular value of the corresponding regional source's leadfields. A contains the 3D Laplacian and is computed as
[math]\mathrm{A} = \mathrm{Y} - \mathrm{I}_{s}[/math]
with Is the [sxs] identity matrix, where s is the number of sources (= three times the number of grid points) and
[math]\mathrm{Y} = \frac{1}{2}\left\{ \mathrm{I}_{s} + \left\lbrack \operatorname{diag}\left( \mathrm{Z} \cdot \left\lbrack 111 \ldots 1 \right\rbrack^{T} \right) \right\rbrack^{- 1} \right\} \cdot \mathrm{Z}[/math]
where
[math]
\mathrm{Z}_{ik} =
\begin{cases}
1/6, & \text{if } \operatorname{dist}\left( i,k \right) = 1 \text{ grid point} \\
0, & \text{otherwise}
\end{cases}
[/math]
The LORETA image in BESA Research displays the norm of the 3 components of S at each location r. Using the menu function Image / Export Image As... you have the option to save this norm of S or alternatively all components separately to disk.
Notes:
- Grid spacing: Due to memory limitations, LORETA images require a grid spacing of 5 mm or more.
- Computation time: Computation speed during the first LORETA image calculation depends on the grid spacing (computation is faster with larger grid spacing). After the first computation of a LORETA image, a *.loreta file is stored in the data folder, containing intermediate results of the LORETA inverse. This file is used during all subsequent LORETA image computations. Thereby, the time needed to obtain the image is substantially reduced.
- MEG: In the case of MEG data, an additional constraint is implemented in the LORETA algorithm that prevents solutions from containing radial source currents (Pascual-Marqui, ISBET Newsletter 1995, 22-29). In MEG, an additional source space regularization is necessary in the inverse matrix operation required compute V.
- Starting LORETA: LORETA can be started from the Image menu or from the Image Selection button.
- Regularization: Please refer to Chapter “Regularization of distributed volume images” for important information on regularization of distributed source models.
sLORETA
This distributed inverse method consists of a standardized, unweighted minimum norm. The method was originally suggested by R.D. Pascual-Marqui (Methods & Findings in Experimental & Clinical Pharmacology 2002, 24D:5-12) Starting point is an unweighted minimum norm computation:
[math]\mathrm{S}_{\text{MN}}\left( t \right) = \mathrm{L}^{T} \cdot \left( \mathrm{L} \cdot \mathrm{L}^{T} \right)^{- 1} \cdot \mathrm{D}(t)[/math]
Here, L is the leadfield matrix of the distributed source model with regional sources distributed on a regular cubic grid. D(t) is the data at time point t. The term in parentheses is generally regularized. Regularization parameters can be specified in the Image Settings.
This minimum norm estimate is now standardized to produce the sLORETA activity at a certain brain location r:
[math]\mathrm{S}_{\text{sLORETA}, r} = \mathrm{R}_{rr}^{-1/2} \cdot \mathrm{S}_{\text{MN},r}[/math]
SsMN,r is the [3x1] (MEG: [2x1]) minimum norm estimate of the 3 (MEG: 2) dipoles at location r. Rrr is the [3x3] (MEG: [2x2]) diagonal block of the resolution matrix R that corresponds to the source components at the target location r. The resolution matrix is defined as:
[math]\mathrm{R} = \mathrm{L}^{T} \cdot \left( \mathrm{L} \cdot \mathrm{L}^{T} + \lambda \cdot \mathrm{I} \right)^{-1} \cdot \mathrm{L}[/math]
The sLORETA image in BESA Research displays the norm of SsLORETA, r at each location r. Using the menu function Image / Export Image As... you have the option to save this norm of SsLORETA, r or alternatively all components separately to disk.
Notes:
- sLORETA can be started from the Image menu or from the Image Selection button.
- Please refer to Chapter “Regularization of distributed volume images” for important information on regularization of distributed inverses.
swLORETA
This distributed inverse method is a standardized, depth-weighted minimum norm (E. Palmero-Soler et al 2007 Phys. Med. Biol. 52 1783-1800). It differs from sLORETA only by an additional depth weighting.
Starting point is a depth-weighted minimum norm computation:
[math]\mathrm{S}_{\text{MN}}\left( t \right) = \mathrm{V} \cdot \mathrm{L}^{T} \cdot \left( \mathrm{L} \cdot \mathrm{V} \cdot \mathrm{L}^{T} \right)^{-1} \cdot \mathrm{D}(t)[/math]
Here, L is the leadfield matrix of the distributed source model with regional sources distributed on a regular cubic grid. D(t) is the data at time point t. The term in parentheses is generally regularized. Regularization parameters can be specified in the Image Settings.
V is the diagonal depth weighting matrix. For s grid locations, V is of dimension [3s x 3s] (MEG: [2s x 2s]). Each diagonal element of V is the inverse of the first singular value of the leadfield of the corresponding regional source. Hence, the first 3 (MEG: 2) diagonal elements equal the inverse of the largest eigenvalue of the leadfield matrix of regional source 1, and so on.
This minimum norm estimate is now standardized to produce the swLORETA activity at a certain brain location r:
[math]\mathrm{S}_{\text{swLORETA},r} = \mathrm{R}_{rr}^{-1/2} \cdot \mathrm{S}_{\text{MN},r}[/math]
SsMN,r is the [3x1] (MEG: [2x1]) depth-weighted minimum norm estimate of the regional source at location r. Rrr is the [3x3] (MEG: [2x2]) diagonal block of the resolution matrix R that corresponds to the source components at the target location r. The resolution matrix is defined as:
[math]\mathrm{R} = \mathrm{V} \cdot \mathrm{L}^{T} \cdot \left( \mathrm{L} \cdot \mathrm{V} \cdot \mathrm{L}^{T} + \lambda \cdot \mathrm{I} \right)^{-1} \cdot \mathrm{L}[/math]
The swLORETA image in BESA Research displays the norm of SswLORETA, r at each location r. Using the menu function Image / Export Image As... you have the option to save this norm of SswLORETA, r or alternatively all components separately to disk.
Notes:
- sLORETA can be started from the Image menu or from the Image Selection button.
- Please refer to Chapter “Regularization of distributed volume images” for important information on regularization of distributed inverses.
sSLOFO
SSLOFO (standardized shrinking LORETA-FOCUSS) is an iterative application of weighted distributed source images with a reduced source space in each iteration (Liu et al., "Standardized shrinking LORETA-FOCUSS (SSLOFO): a new algorithm for spatio-temporal EEG source reconstruction", IEEE Transactions on Biomedical Engineering 52(10), 1681-1691, 2005).
In an initialization step, an sLORETA image is calculated. Then in each iteration the following steps are performed:
- A weighted minimum norm solution is computed according to the formula [math]\mathrm{S} = \mathrm{V} \cdot \mathrm{L}^{T} \cdot \left( \mathrm{L} \cdot \mathrm{V} \cdot \mathrm{L}^{T} \right)^{-1} \cdot \mathrm{D}[/math] . Here, L is the leadfield matrix of the distributed source model with regional sources distributed on a regular cubic grid. D is the data at the time point under consideration. V is a diagonal spatial weighting matrix that is computed in the previous iteration step. In the first iteration, the elements of V contain the magnitudes of the initially computed LORETA image.
- Standardization of this weighted minimum norm image is performed with the resolution matrix as in sLORETA.
- The obtained standardized weighted minimum norm image is being smoothed to get Ssmooth.
- All voxels with amplitudes below a threshold of 1% of the maximum activity get a weight of zero in the next iteration step, thus being effectively eliminated from the source space in the next iteration step.
- For all other voxels, compute the elements of the spatial weighting matrix V to be used in the next iteration as follows: [math]\mathrm{V}_{ii,\text{next iteration}} = \frac{1}{\left\| \mathrm{L}_{i} \right\|} \cdot \mathrm{S}_{ii,\text{smooth}} \cdot \mathrm{V}_{ii,\text{current iteration}}[/math]
The procedure stops after 3 iterations. Please note that you can change all parameters by creating a user-defined volume image.
Notes:
- Starting sSLOFO: sSLOFO can be started from the Image menu or from the Image Selection button.
- Please refer to Chapter Regularization of distributed volume images for important information on regularization of distributed inverses.
User-Defined Volume Image
In addition to the predefined 3D imaging methods in BESA Research, it is possible to create user-defined imaging methods based on the general formula for distributed inverses:
[math]\mathrm{S}\left( t \right) = \mathrm{V} \cdot \mathrm{L}^{T} \cdot \left( \mathrm{L} \cdot \mathrm{V} \cdot \mathrm{L}^{T} \right)^{-1} \cdot \mathrm{D}(t)[/math]
Here, L is the leadfield matrix of the distributed source model with regional sources distributed on a regular cubic grid. D(t) is the data at time point t. Custom-defined parameters are:* The spatial weighting matrix V: This may include depth weighting, image weighting, or cross-voxel weighting with a 3D Laplacian (as in LORETA) or an autoregressive function (as in LAURA).
- Regularization: The term in parentheses is generally regularized. Note that regularization has a strong effect on the obtained results. Please refer to chapter “Regularization of Distributed Volume Images” for more information.
- Standardization: Optionally, the result of the distributed inverse can be standardized with the resolution matrix (as in sLORETA).
- Iterations: Inverse computations can be applied iteratively. Each iteration is weighted with the image obtained in the previous iteration.
All parameters for the user-defined volume image are specified in the User-Defined Volume Tab of the Image Settings dialog box. Please refer to chapter “User-Defined Volume Tab” for details.
Notes:
- Starting the user-defined volume image: the image calculation can be started from the Image menu or from the Image Selection button.
- Please refer to Chapter “Regularization of distributed volume images” for important information on regularization of distributed inverses.
Regularization of distributed volume images
Distributed source images require the inversion of a term of the form L V LT. This term is generally regularized before its inversion. In BESA Research, selection can be made between two different regularization approaches (parameters are defined in the Image Settings dialog box):
- Tikhonov regularization: In Tikhonov regularization, the term L V LT is inverted as (L V LT +λ I)-1. Here, l is the regularization constant, and I is the identity matrix.
- One way of determining the optimum regularization constant is by minimizing the generalized cross validation error (CVE).
- Alternatively, the regularization constant can be specified manually as a percentage of the trace of the matrix L V LT.
- TSVD: In the truncated singular value decomposition (TSVD) approach, an SVD decomposition of L V LT is computed as L V LT = U S UT, where the diagonal matrix S contains the singular values. All singular values smaller than the specified percentage of the maximum singular values are set to zero. The inverse is computed as U S-1 UT, where the diagonal elements of S-1 are the inverse of the corresponding non-zero diagonal elements of S.
Regularization has a critical effect on the obtained distributed source images. The results may differ completely with different choices of the regularization parameter (see examples below). Therefore, it is important to evaluate the generated image critically with respect to the regularization constant, and to keep in mind the uncertainties resulting from this fact when interpreting the results. The default setting in BESA Research is a TSVD regularization with a 0.03% threshold. However, this value might need to be adjusted to the specific data set at hand.
The following example illustrates the influence of the regularization parameter on the obtained images. The data used here is condition St-Cor of dataset Examples \ TFC-Error-Related-Negativity \ Correct+Error.fsg at 176 ms following the visual stimulus. Discrete dipole analysis reveals the main activity in the left and right lateral visual cortex at this latency.
Discrete source model at 176 ms: Main activity in the left and right lateral visual cortex, no visual midline activity.
LORETA images computed at this latency depend critically on the choice of the regularization constant. The following 3D images are created with TSVD regularization with SVD cutoffs of 0.1%, 0.005%, and 0.0001%, respectively. The volume grid size was 9 mm. The example demonstrates the dramatic effect of regularization and demonstrates the typical tradeoff between too strong regularization (leading to too smeared 3D images that tend to show blurred maxima) and too small regularization (resulting in too superficial 3D images with multiple maxima).
The automatic determination of the regularization constant using the CVE approach does not necessarily result in the optimum regularization parameter either. In this example, the unscaled CVE approach rather resembles the TSVD image with a cutoff of 0.0001%, i.e. regularization is too small. Therefore, it is advisable to compare different settings of the regularization parameter and make the final choice based on the above-mentioned considerations.
Cortical LORETA
Cortical LORETA is principally the same technique as LORETA, however, Cortical LORETA is not computed in a 3D volume, but on the cortical surface.
The cortical reconstruction in BESA Research fed from BESA MRI is a closed 2D surface with no boundaries and a very close approximation of the actual cortical form. It consists of an irregular triangulated grid.
The Laplace operator that is used for identifying a smooth solution in a three-dimensional space is exchanged with a Laplace operator that runs on the two-dimensional cortical surface.
There is a wide variety of 2D Laplace operators with different characteristics. The general form of the discrete Laplace operator is
[math]\Delta f\left( p_{i} \right) = \frac{1}{d_{i}}\sum_{j \in N(i)}^{}{w_{ij}\left\lbrack f\left( p_{i} \right) - f\left( p_{j} \right) \right\rbrack},[/math]
where pi is the i-th node of the triangular mesh, f(pi) is the value of a function f defined on the cortical mesh at the node pi, wij is the weight for the connection between the nodes pi and pj and di is a normalization factor for the i-th row of the operator. Furthermore, N(i) is the set of indices corresponding to the direct (also called "1-ring") neighbors of pi.
BESA offers the choice of three Laplace operators with slightly different characteristics.
- Unweighted Graph Laplacian: This is the simplest operator. It takes into account only the adjacency of the nodes and not the geometry of the mesh:
[math]
w_{ij} =
\begin{cases}
1, & \text{if } p_{i} \text{ and } p_{j} \text{ are connected by an edge} \\
0, & \text{otherwise}
\end{cases}
[/math]
[math]d_{i} = 1[/math]
- Weighted Graph Laplacian: This operator is similar to the unweighted graph Laplacian but with different weights for the different connections. The connections between nearby nodes get larger weights than the connections between farther nodes:
[math]w_{ij} = \frac{1}{\operatorname{dist}\left( p_{i},p_{j} \right)}[/math]
[math]d_{i} = \sum_{j \in N(i)}^{} {\operatorname{dist}\left(p_{i}, p_{j} \right)}[/math]
where dist (pi , pj) is the distance between the nodes pi and pj.
- Geometric Laplacian with mixed area weights: This operator takes into account the angles in the corresponding triangles into account as well as the area around the nodes in order to determine the connection weights:
[math]w_{ij} = \frac{\cot\left( \alpha_{ij} \right) + \cot\left( \beta_{ij} \right)}{2}[/math]
[math]d_{i} = A_{\text{mixed}}[/math]
where αij and βij denote the two angles opposite to the edge (i , j) and Amixed is either the Voronoi area, or 1/2 of the triangle area or 1/4 of the triangle area depending on the type of the triangle.
Regularization and other parameters:
- SVD cutoff: The regularization for the inverse operator as a percent of the largest singular value.
- Depth weighting: Turn depth weighting on or off.
- Laplacian type: Selection of Laplacian operators (see above).
Notes:
- Starting Cortical LORETA: Cortical LORETA can be started from the sub-menu Surface Image of the Image menu or from the Image Selection button.
- Please refer to Chapter “Regularization of distributed volume images” for important information on regularization of distributed inverses.
Cortical CLARA
Cortical CLARA is principally the same technique as CLARA, but Cortical CLARA is not computed in a 3D volume, but on the cortical surface. Instead of using a LORETA image as the basis for the iterative application, cortical CLARA uses cortical LORETA.
Regularization and other parameters:
- SVD cutoff: The regularization for the inverse operator as a percent of the largest singular value.
- Depth weighting: Turn depth weighting on or off.
- Laplacian type: Selection of Laplacian operators (see Cortical LORETA).
- No of iterations: Number of iterations for CLARA. The more iterations are used, the sparser becomes the solution.
- Automatic: The algorithm tries to determine the number of iterations automatically. The goodness of fit (GOF) is calculated after every iteration and if there is a big jump in the GOF then the algorithm will stop. If no jumps appear during the calculations then CLARA iterates until the specified number of iterations is reached.
- Regularize iterations: If one wants to use different regularization for the CLARA iterations than the value specified as "SVD cutoff", this option should be selected.
- Amount to clip from img (%): Cortical CLARA uses the solution from the previous iteration as an additional weighting matrix for the current iteration. That weighting matrix is constructed by cutting the "low" activity from the solution. This number specifies how much of the activity should be cut from the previous solution in order to construct the weighting matrix. This value is given as a percentage of the maximal activity. Default value is 10%.
Notes:
- Starting Cortical CLARA: Cortical CLARA can be started from the sub-menu Surface Image of the Image menu or from the Image Selection button.
- Please refer to Chapter “Regularization of distributed volume images” for important information on regularization of distributed inverses.
Cortex Inflation
The inflated cortex is a smoothened version of the individual cortical surface with minimal metric distortions (Fischl, B. et al. (1999). Cortical Surface-Based Analysis: II: Inflation, Flattening, and a Surface-Based Coordinate System. NeuroImage, 9(2), 195–207). Gyri and sulci are smoothened out. The original distances between each point on the cortex and its neighbors are, however, mostly preserved.
Cortical LORETA map overlaid on top of the inflated cortical surface.
A lighter gray color overlaid on top of the surface image indicates the location of a gyrus of the individual cortex surface, while a darker gray color indicates the location of a sulcus. The inflated cortical surface can be computed in BESA MRI 2.0. For more details please refer to the BESA MRI 2.0 help.
Surface Minimum Norm Image
Introduction
The minimum norm approach is a common method to estimate a distributed electrical current image in the brain at each time sample (Hämäläinen & Ilmoniemi 1984). The source activities of a large number of regional sources are computed. The sources are evenly distributed using 1500 standard locations 10% and 30% below the smoothed standard brain surface (when using the standard MRI) or using between 3000-4000 locations on the individual brain surface defined by the gray-white-matter boundary.
Since the number of sources is much larger than the number of sensors in a minimum norm solution, the inverse problem is highly underdetermined and must be stabilized by a mathematical constraint, the minimum norm. Out of the many current distributions that can account for the recorded sensor data, the solution with the minimum L2 norm, i.e. the minimum total power of the current distribution is displayed in BESA Research.
First, the forward solution (leadfield matrix L) of all sources is calculated in the current head model. Then, the source activities S(t) of all source components are computed from the data matrix D(t) using an inverse regularized by the estimated noise covariance matrix:
[math]\mathrm{S}\left( t \right) = \mathrm{R} \cdot \mathrm{L}^{T} \cdot \left( \mathrm{L} \cdot \mathrm{R} \cdot \mathrm{L}^{T} + \mathrm{C}_N \right)^{-1} \cdot \mathrm{D}(t)[/math]
Here, L is the leadfield matrix of the distributed regional source model, CN denotes the noise correlation matrix in sensor space, and R is a weighting matrix in source space. R and CN can be designed in different ways in order to optimize the minimum norm result. The total activity of each regional source is computed as the root mean square of the source activities S(t) of its 3 (MEG:2) components. This total source activity is transformed to a color-coded image of the brain surface. (When the standard brain is used, two sources are assigned to each surface location, located 10% and 30% below the surface, respectively. The color that is displayed on the standard brain surface is the larger of the two corresponding source activities.)
Weighting options
The minimum norm current imaging techniques of BESA Research provide different weighting strategies. Two weighting approaches are available: Depth weighting and spatio-temporal approaches.
- Depth weighting: Without depth weighting, deep sources appear very smeared in a minimum-norm reconstruction. With depth weighting, both deep and superficial sources produce a similar, more focal result. If this weighting method is selected, the leadfield of each regional source is scaled with the largest singular value of the SVD (singular value decomposition) of the source's leadfield.
- Spatio-temporal weighting: Spatio-temporal weighting tries to assign large weight to sources that are assumed to be more likely to contribute to the recorded data.
- Subspace correlation after single source scan: This method divides the signal into a signal and a noise subspace. The correlation of the leadfield of a regional source i with the signal subspace (pi) is computed to find out if the source location contributes to the measured data. The weighting matrix R becomes a diagonal matrix. Each of the three (MEG: 2) components of a regional source get the same weighting value pi2. This approach is based on the signal subspace correlation measure introduced by J.C. Mosher, R. M. Leahy (Recursive MUSIC: A Framework for EEG and MEG Source Localization, IEEE Trans. On Biomed. Eng. Vol. 45, No. 11, November 1998)
- Dale & Sereno 1993: In the approach of Dale and Sereno (J Cogn Neurosci, 1993, 5: 162-176) a signal subspace needs not be defined. The correlation pi of the leadfield of regional source i with the inverse of the data covariance matrix is computed along with the largest singular value λmax of the data covariance matrix. The weighting matrix R is a diagonal matrix with weights: . Each of the three (MEG: 2) components of a regional source receives the same weighting value.
Noise regularization
Two methods to estimate the channel noise correlation matrix CN are provided by the program:
- Use baseline: Select this option to estimate the noise from the user-definable baseline. The signal is computed from the data at non-baseline latencies.
- Use 15% lowest values: The baseline activity is computed from the data at those 15% of all displayed latencies that have the lowest global field power. The signal is computed from all displayed latencies.
In each case, the activity (noise or signal, respectively) is defined as root-mean-square across all respective latencies for each channel.
The noise covariance matrix CN is constructed as a diagonal matrix. The entries in the main diagonal are proportional to the noise activity of the individual channels (if selected) or are all equally proportional to the average noise activity over all channels. The noise covariance matrix CN is then scaled such that the ratio of the Frobenius norms of the weighted leadfield projector matrix (LRLT) and the noise covariance matrix CN equals the Signal-to-Noise ratio. This scaling can be multiplied by an additional factor (default=1) to sharpen (<1) or smoothen (>1) the minimum norm image.
Applying the Minimum Norm Image
The minimum-norm algorithm is started via the Surface minimum norm image dialog box, which is opened from the Image menu, or by typing the shortcut Ctrl-M: Please refer to Chapter “Surface Minimum Norm Tab” for more details.
As opposed to the other 3D images available from the Image menu, the surface minimum norm image is not computed on a volumetric grid, but rather for locations on the brain surface. Accordingly, the results of the minimum norm image are displayed superimposed to the brain surface mesh rather than to the volumetric MR image.
The figure below shows a minimum norm image computed from the file Examples\Epilepsy\Spikes\Spikes-Child4_EEG+MEG_averaged.fsg. The EEG spike peak was imaged using the individual brain surface of the subject. A baseline from -300 to -70 ms was used. Minimum norm was computed with depth weighting, Spatio-temporal weighting according to Dale & Sereno 1993 and individual noise weighting with a noise scale factor of 0.01. The minimum norm image reveals the location of the spike generator in the close vicinity of the frontal left-hemispheric lesion in this subject.
Multiple Source Probe Scan (MSPS)
Introduction
The MSPS function provides a tool for the validation of a given solution. It is based on the following theoretical consideration: If the recorded EEG/MEG data has been modeled adequately, i.e. all active brain regions are represented by a source in the current solution, then any additional probe source added to the solution will not show any activity apart from noise. The only exception occurs if this probe source is placed in close vicinity to one of the sources in the current solution. In that case, the solution's source and the probe source will share the activity of the corresponding brain area. The MSPS applies these considerations by scanning the brain on a pre-defined grid with a regional probe added to the current solution. Grid extent and density can be specified in the Image settings. The power P of the probe source at location r in the signal interval is compared with the power of the probe source in a reference interval, defining a value q:
[math]\mathrm{q}\left( r \right) = \sqrt{\frac{\mathrm{P}\left( r \right)}{\mathrm{P}_{\text{ref}}\left( r \right)}} - 1[/math]
MSPS can be computed on time domain or time-frequency domain data:
- In the time domain, q(r) is computed from the source waveform of the probe source. Here, P(r) is the mean power of the probe source at location r in the marked latency range, and Pref(r) is the mean probe source power in the user-definable baseline interval.
- In the time-frequency domain, an MSPS image can be computed from the complex cross spectral density matrices. By applying the inverse operator for a source configuration consisting of the current solution and the probe source, the power of the probe source can be computed for the target interval [P(r)] and the reference time-frequency interval [Pref(r)]. In the resulting MSPS image, q-values are shown in %, where q[%] = q*100.
The inverse operator used to determine the probe source power uses different regularization constants for the probe source and the sources in the current solution. The regularization constant of the sources in the current solution can be specified in the Image settings (default 4%). The regularization constant of the probe source is internally set to 0%.
Alternatively to the definition above, q can also be displayed in units of dB:
[math]\mathrm{q}\left\lbrack \text{dB} \right\rbrack = 10 \cdot \log_{10}\frac{\mathrm{P}\left( r \right)}{\mathrm{P}_{\text{ref}}\left( r \right)}[/math]
Values of q smaller than zero are not shown in the MSPS image.
According to the considerations above, an MSPS of a correct source model should optimally yield image maxima around the sources in the current solution only. If the MSPS image is blurred or shows maxima at locations different from the modeled sources, this indicates a non-sufficient or incorrect solution.
Applying the MSPS
This chapter illustrates the application of the Multiple Source Probe Scan. The figures are generated with data from file Examples/Epilepsy/Spikes/Rolandic-Spike-Child.fsg (-300 : +200 ms, filtered from 3 Hz [forward] to 40 Hz [zero-phase]).
Time domain versus time-frequency domain MSPS
The multiple source probe scan can be computed in the time domain or the time-frequency domain. The latter is possible only when time-frequency domain data is available for the current condition, i.e. if the condition has been created by starting a multiple source beamformer (MSBF) computation from the source coherence window. In this case, evoking the MSPS calculation from the Imaging button or from the Image menu will bring up the following dialog window that allows to choose between time- or time-frequency MSPS. If only time domain data is available, this dialog window will not appear and MSPS will be computed in the time domain.
For a time-frequency domain MSPS, the target and the reference time-frequency interval have been specified already in the Time-Frequency window (see Chapter "How To Create Beamformer Images"). For a time-domain MSPS, the target and the reference epoch have to be specified in the Source Analysis window as described below.
Time domain MSPS
The time-domain MSPS image displays the ratio of the power of a regional probe source in the signal and the baseline interval. The currently set baseline is indicated by a horizontal line in the upper left corner of the channel box.
By default, BESA Research defines the pre-stimulus interval of the current data segment as baseline. The baseline should represent a latency range in which no event-related activity is present in the data. There are several possibilities to modify the baseline interval: by clicking on the horizontal line with the left mouse button or by using the corresponding entry in the Condition menu or Fit Interval popup menu.
Mark an interval to define the target epoch, i.e. the time-interval for which the current solution is to be tested. Start the MSPS by selecting it from the Image selection button or from the Image menu to start the probe source scan. The Image menu can be evoked either from the menu bar or by right-clicking anywhere in the source analysis window. The 3D window opens and displays the scan result.
Time-Resolved MSPS
If the MSPS has been computed on time domain data, the image can be shown separately for each latency in the selected interval. After the MSPS has been computed for the marked epoch, double-click anywhere within this epoch to display the ratio of the probe source magnitude at the selected latency and the mean probe source magnitude in the baseline. Scanning the latency range by moving the cursor (e.g. with the left and right arrow cursor keys) provides a time-resolved MSPS image.
Time-resolved MSPS images are not available if the MSPS has been computed on data in the time-frequency domain.
Notes:
- You can hide or re-display the last computed image by selecting the corresponding entry in the Image menu.
- The current image can be exported to ASCII or BrainVoyager vmp-format from the Image menu.
- For scaling options, please refer to the scaling buttons popup menu .
- Parameters used for the MSPS calculations can be set in the General Settings tab of the Image Settings dialog box.
Source Sensitivity
Introduction
The 'Source sensitivity' function displays the sensitivity of the selected source in the current source model to activity in other brain regions. Sensitivity is defined as the fraction of power at the scanned brain location that is mapped onto the selected source.
To compute the source sensitivity, unit brain activity is modeled at different locations (probe source) throughout the brain. To this data, the current source model is applied to compute the source waveforms SCM of all modeled sources:
[math]\mathrm{S}_{\text{CM}} = \mathrm{L}_{\text{CM}}^{-1} \cdot \mathrm{L}_{\text{PS}}[/math]
Here LCM-1 is the regularized inverse operator for the current model, and LPS is the leadfield of the regional probe source (dimension [Nx3] for EEG and [Nx2] for MEG, respectively, where N is the number of sensors). The source amplitude SSS of the selected source in the model is a 3x3 (MEG: 2x2) sub-matrix of SCM (if the selected source is a regional source) or a 1x3-matrix (MEG: 1x2) (if the selected source is a dipole). The root mean square of the singular values of SCM is defined as the source sensitivity.
The 3D source sensitivity image displays this value for all locations on a grid specified under Image/Settings. Grid density can be specified in the Image Settings.
Applying the Source Sensitivity Image
The Source Sensitivity image is evoked from the Image menu or by pressing the corresponding hot key (default: V).
This function is enabled only when a solution with an active selected source is present in the Source Analysis window. The source sensitivity image then displays the sensitivity of the selected source to activity in other brain regions.
Source Sensitivity image for the selected frontal source (green) in model 'High_Intensity_3RS.bsa' in folder 'Examples/ERP_Auditory_Intensity'. The data displayed is the '100dB' condition in file 'All_Subjects_cc.fsg'. The selected source is sensitive to activity in the frontal brain region (yellow/white), while it is not influenced by activity in the vicinity of the left and right auditory cortex areas, which are modeled by the red and blue source in the model (transparent/gray).
Notes:
- The sensitivity image is independent of the recorded sensor signals. It only depends on the current source model, the sensor configuration, the head model, and the regularization constant.
- If the regularization constant is set to zero, each source has a sensitivity of 100% to activity around its own location. With increasing regularization, the spatial filter becomes less focused, and the sensitivity of a source to activity at its location decreases.
- You can hide or re-display the last computed image by selecting the corresponding entry in the Image menu.
- The current image can be exported to ASCII or BrainVoyager vmp-format from the Image menu.
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Source Analysis |
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Integration with MRI and fMRI | |
Source Coherence | |
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MATLAB Interface | |
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