Difference between revisions of "BoneJ2"
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| author = {{Person|Michaeldoube}}, {{Person|Rdom}}, {{Person|Alessandrofelder}} | | author = {{Person|Michaeldoube}}, {{Person|Rdom}}, {{Person|Alessandrofelder}} | ||
| maintainer = {{Person|Michaeldoube}}, {{Person|Rdom}}, {{Person|Alessandrofelder}} | | maintainer = {{Person|Michaeldoube}}, {{Person|Rdom}}, {{Person|Alessandrofelder}} | ||
− | | source = {{GitHub|org=bonej-org|repo=BoneJ2}} | + | | source = {{GitHub|org=bonej-org|repo=BoneJ2}}, [https://doi.org/10.5281/zenodo.1427262 doi:10.5281/zenodo.1427262] |
| released = Dec 11<sup>th</sup>, 2017 | | released = Dec 11<sup>th</sup>, 2017 | ||
| latest version = cuneiform-experimental-patch2, Sep 24<sup>th</sup>, 2018 | | latest version = cuneiform-experimental-patch2, Sep 24<sup>th</sup>, 2018 |
Revision as of 23:53, 26 September 2018
BoneJ experimental (ImageJ) | |
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Author | Michael Doube, Richard Domander, Alessandro Felder |
Maintainer | Michael Doube, Richard Domander, Alessandro Felder |
Source | on GitHub, doi:10.5281/zenodo.1427262 |
Initial release | Dec 11^{th}, 2017 |
Latest version | cuneiform-experimental-patch2, Sep 24^{th}, 2018 |
Development status | Active, Experimental |
BoneJ is a collection of skeletal biology plug-ins for ImageJ.
This is the new experimental, modernized version of the software available through the ImageJ updater. Its update site is called BoneJ experimental. For the old ImageJ1 version, see BoneJ.
This version works with the latest Fiji, and complies with the modern ImageJ architecture. Most plug-ins also now support hyperstacks, i.e. images with multiple channels or time frames.
As the code is still experimental, it's still likely to change a lot. This means any scripts using the code might break, results can change, and plug-ins gain and lose parameters. Tools marked with WIP (work in progress), are more likely to undergo large changes.
Below is the documentation for the plug-ins included in BoneJ experimental.
Contents
- 1 Installation
- 2 Analyse skeleton
- 3 Anisotropy
- 4 Area/Volume fraction
- 5 Calibrate SCANCO (WIP)
- 6 Check voxel depth (WIP)
- 7 Connectivity
- 8 Delete slice range (WIP)
- 9 Ellipsoid factor (WIP)
- 10 Fit ellipsoid
- 11 Fit sphere (WIP)
- 12 Fractal dimension
- 13 Inter-trabecular angles
- 14 Local thickness
- 15 Moments of inertia (WIP)
- 16 Optimise threshold (WIP)
- 17 Orientation (WIP)
- 18 Purify (WIP)
- 19 Skeletonise
- 20 Slice geometry (WIP)
- 21 Surface area
- 22 Surface fraction
- 23 Results table
- 24 Where is my favorite plug-in?
- 25 Licence
- 26 Citation
Installation
- Download the latest version of Fiji for your operating system
- Launch Fiji
- Select in the menu Help > Update...
- Click Manage update sites
- Check BoneJ experimental
- Click Close
- Click Apply changes
After the downloads have finished, close and restart Fiji.
Analyse skeleton
Menu path Plugins > BoneJ > Analyse skeleton.
This plug-in simply includes AnalyzeSkeleton in BoneJ. It adds some additional validation to check that your image suits the tool. It also skeletonizes your image by calling Skeletonize3D if needed.
Suitable images
The input image must be 2D or 3D, 8-bit and binary. Hyperstacks are not supported.
Differences to BoneJ1
Calls the latest version of AnalyzeSkeleton.
Anisotropy
Menu path Plugins > BoneJ > Anisotropy.
Anisotropy is used to quantify the directionality of trabecular bone. It tells whether the trabeculae have a certain orientation, or if they're randomly aligned. The method to measure anisotropy is fairly complex and consists of multiple steps:
- Find mean intercept length (MIL) vectors from directions
- Plot MIL vectors into a point cloud
- Solve the equation of an ellipsoid that best fits the point cloud
- Calculate the degree of anisotropy from the radii of the ellipsoid
It's important to note that algorithm is stochastic and does not guarantee exact results. Thus it's recommended to run it several times to establish the degree of anisotropy in your image.
In the first step the algorithm draws parallel lines over the input image in direction . The direction is chosen randomly. Each line segment in the image stack is sampled to find points where it changes from background to foreground, i.e. where the line enters an object. The points are called phase changes, in the adjacent figure they're marked with red dots. After the sampling is complete, the algorithm forms a MIL vector, whose length is the total length of the line segments divided by the total number of phase changes found. The MIL vector has the same direction as . Drawing and sampling the lines is repeated for directions, and the method creates MIL vectors.
After the MIL vectors have been calculated, they are added to a point cloud (a collection of points) around the origin. Then the method tries solve the equation of an ellipsoid that would fit the cloud. There may be no solution, especially if there are few points. That is, the fitting may fail at which point the plug-in stops. The radii of this ellipsoid determine the degree of anisotropy (see results).
In more detail, the lines in the first step are projected from a plane with normal (see the adjacent figure). The size , where are the dimensions of the image stack. Each of the lines originates from a random point on the plane. The plane is divided into same-sized sections, where is a number selected by the user (i.e. Lines per dimension). One origin is randomly selected from within each section. The lines are projected until they intercept the stack edges at points , (the algorithm solves for , ). These line segments within the stack are then sampled for phase changes. In this drawing method some lines may miss the image stack completely, but conversely there aren't any areas in the stack that don't have an equal chance of being sampled.
Suitable images
A 3D binary image.
The plug-in is intended to analyse the "texture" of an object thus it suits samples of a larger whole, e.g. a trabecular cube that fills the whole stack. The results for whole objects such as the pre-packaged Bat Cochlea Volume ImageJ sample image are not really meaningful.
Parameters
- Directions: number of times sampling is performed from different directions. The minimum is , because that's how many independent variables the algorithm needs to solve the "shape" of the orientation in the image.
- Lines per dimension: controls how many parallel lines are drawn per each direction. For example, if lines per dimension is then Anisotropy draws lines. In this case, the origin points of the lines are randomly selected from within the equal sections of the sampling plane (see above detailed explanation). The number is squared, because the location of the origins can vary in two dimensions.
then the plane is divided into equal sections, and a line is drawn from each. The origin point of each line is randomly located within their section.
- Sampling increment: controls how often each line is sampled. The default is , which means that after each step a unit vector (a long line) is added to the position along a sampling line. The number of samples taken per line depends on the length of the line segment within the image stack.
- Recommended minimum: if checked, then the above three parameters are set to the recommended minimum values. In our tests we found that with these values the results are quite stable, and fitting unlikely to fail. However, these minimums are not guaranteed to be the best settings for your image.
- Show radii: if checked, then the radii of the fitted ellipsoid are shown in the results table.
Results
- Degree of anisotropy: how much orientation there is in the structure. means the image is completely isotropic, the sample has no directionality whatsoever. means there is very strong orientation in the structure of the image. Note that these are theoretical minimum and maximum values. Due the stochastic nature of the algorithm, even an empty stack will have non-zero degree of anisotropy.
- Radii of fitted ellipsoid (optional): the lengths of the radii of the ellipsoid fitted on the MIL points. Degree of anisotropy .
The measures are reported separately for each 3D subspace in the image, i.e. for each channel and time frame.
Differences to BoneJ1
- The results of this Anisotropy do not stabilize, so it's not repeated automatically like in BoneJ1. However, the results vary less between runs.
- MIL vectors are drawn differently. In BoneJ1 they're drawn in sphere-shapes around random seed points. Here parallel lines from different directions are drawn through the whole stack. We think this method produces more uniform sampling, i.e. there's less chance of a directional bias.
Related publications
- Odgaard A (1997), Three-dimensional methods for quantification of cancellous bone architecture, Bone, 20, 315-328, doi:10.1016/S8756-3282(97)00007-0
- Harrigan TP, Mann RW (1984), Characterization of microstructural anisotropy in orthotropic materials using a second rank tensor, J Mater Sci, 19, 761-767, doi:10.1007/BF00540446
Area/Volume fraction
Menu path Plugins > BoneJ > Fraction > Area/Volume fraction
Area/Volume fraction calculates the fraction of bone in an image by it to the whole image. It counts all the foreground voxels, which it assumes represent bone, and compares them to the total number of voxels in the image. More formally defined, the plug-in calculates the fraction BV/TV, which is the volume of mineralised bone BV per unit volume of the sample TV. In case of a 2D image, it calculates the fraction BA/TA, which is the area of bone per unit area of the sample.
Suitable images
A 2D or 3D binary image
Results
- Bone volume: volume of the bone voxels.
- Total volume: volume of the whole image.
- Volume ratio: ratio of bone to total volume.
The measures are reported separately for each 2D/3D subspace in the image, i.e. for each channel and time frame. Results will be for area if image is 2D.
Differences to BoneJ1
- In BoneJ1 the plug-in was called Volume fraction
- Can process 2D images
- Supports hyperstacks
Calibrate SCANCO (WIP)
Menu path Plugins > BoneJ > Analyze > Calibrate SCANCO
Applies the mg HA/ccm pixel value calibration, i.e. HU or Hounfield unit calibration stored in the .isq format metadata to the image.
Suitable images
An .isq format image generated by Scanco X-ray microtomography scanners.
Check voxel depth (WIP)
Menu path Plugins > BoneJ > Stacks > Check Voxel Depth
Checks whether slice spacing has been calibrated correctly. Some DICOM images contain slice thickness data in the header information, but thickness is not necessarily the same as the physical distance between consecutive slices' positions.
Suitable images
A 3D image.
Connectivity
Menu path Plugins > BoneJ > Connectivity.
The Connectivity plug-in is designed to estimate the number of connected structures i.e. trabeculae in a trabecular network. This connectivity measure is related to a topological number known as Euler characteristic, Euler number or Euler-Poincaré characteristic. Mathematically defined connectivity is . Roughly speaking, describes the shape or structure of a topological space. It can also be expressed as , where a handle is a hole that goes through an object (e.g the hole in a doughnut, or the ear of a coffee mug), and a cavity is enclosed inside one. When measuring trabecular cubes, you need to add to to get a more accurate estimate of the connectivity of the whole network. The term corrects for the change in the topology of an object, when it's cut to pieces.
NB some other Euler characteristic implementations report as , i.e. in them the correction is implicit.
Suitable images
The input image must be 3D and binary. The plug-in assumes that there is only one particle in the foreground; to achieve this, run Purify. Having more than one object often leads to negative connectivity.
Results
- Euler characteristic (χ): describes the shape of the object(s) in the image, .
- Corrected Euler (χ + Δχ): the Euler characteristic of the part corrected for edge effects to fit the whole.
- Connectivity: gives an estimate of the number of connected trabeculae in the image. Equal to .
- Conn. density: connectivity divided by unit volume.
The measures are reported separately for each 3D subspace in the image, i.e. for each channel and time frame.
Differences to BoneJ1
- Supports hyperstacks
- The old version reported Corrected Euler (χ + Δχ) incorrectly as Δχ
Related publications
- Odgaard A, Gundersen HJG (1993), Quantification of connectivity in cancellous bone, with special emphasis on 3-D reconstructions, Bone 14: 173-182, doi:10.1016/8756-3282(93)90245-6.
- Toriwaki J, Yonekura T (2002), Euler number and connectivity indexes of a three dimensional digital picture, Forma 17: 183-209
Delete slice range (WIP)
Menu path Plugins > BoneJ > Stacks > Delete slice range
Removes a range of slices from a stack, so that cropping in the Z direction is practical.
Suitable images
A 3D image.
Ellipsoid factor (WIP)
Menu path Plugins > BoneJ > Ellipsoid factor.
Ellipsoid Factor is a new method for measuring rod/plate geometry. It uses the axis lengths from prolate, oblate and intermediate elipsoids to determine how prolate or oblate the trabecular space is at a particular point. Highly prolate (javelin-shaped, rod-like) ellipsoids have a single long axis () and two short axes () such that , whereas highly oblate (discus-shaped, plate-like) ellipsoids have two longer axes () and one much shorter axis () so that . Calculating as the difference in ratios, leads to a useful scale ranging from (oblate, ) to (prolate, ). of indicates an intermediate ellipsoid where , which is the case for spheres () and other ellipsoids with axis ratios . Ellipsoid Factor runs Skeletonize3D to get the medial axis of the trabeculae, which is used as the seed for sampling. Ellipsoids are seeded from each voxel on the medial axis. A combination of dilation, contraction, rotation and a small amount of translation is run iteratively until the ellipsoid increases no further in volume.
The EF at a point in the structure is determined as the EF of the most voluminous ellipsoid which contains that point.
If you use Ellipsoid Factor in your work, please cite: Doube M (2015), The Ellipsoid Factor for quantification of rods, plates and intermediate forms in 3D geometries, Frontiers in Endocrinology, 6:15, doi: 10.3389/fendo.2015.00015
Suitable images
A binary 3D image.
Parameters
- Sampling increment: distance between sample points on each vector; should be less than the pixel spacing.
- Vectors: number of vectors to sample at each seed point.
- Skeleton points per ellipsoid: allows dense or sparse sampling, a value of means that an ellipsoid is sampled at every seed point.
- Contact sensitivity: how many vectors must touch the background before dilation stops.
- Maximum iterations: how hard to try to find larger ellipsoids - fitting will stop if no improvement has been made after this number of iterations..
- Maximum drift: how far the centroid may be displaced from its seed point.
- EF image: stack containing EF values for each point contained by at least one ellipsoid and NaN elsewhere.
- Ellipsoid ID image: stack containing the ID of the biggest ellipsoid at each point, ranked in descending order ( is the largest ellipsoid).
- Volume image: image showing the volume of the largest ellipsoid containing that point.
- Axis ratio images: images showing and ratios foreach point containing at least one ellipsoid and NaN elsewhere.
- Flinn peak plot: plot of vs weighted by volume, so bright pixels indicate relatively more of the structure has that axis ratio.
- Gaussian sigma: amount to blur the Flinn peak plot - set to for a precise but less 'beautiful' result.
- Flinn plot: unweighted Flinn plot - every ellipsoid is represented by the same sized point regardless of ellipsoid size.
Results
- EF image: stack containing EF values. NaN (not a number) values are used in the background. Summary statistics can be obtained by running Analyze > Histogram
- Short-Mid image: stack containing the ratios
- Mid-Long image: stack contining the ratios
- Volume image: stack containing ellipsoid volumes
- Max id image: stack containing the ID of the largest ellipsoid at each point; IDs relate to the sort order based on volume, so ID = 0 is the largest ellipsoid. is foreground and background is labelled with a large negative number.
- Flinn diagram: plot of versus values present in the volume
- Weighted Flinn plot: Flinn diagram with peaks of intensity proportional to volume occupied by each (, ) ratio
Related publications
Salmon PL, Ohlsson C, Shefelbine SJ, Doube M (2015), Structure model index does not measure rods and plates in trabecular bone, Frontiers in Endocrinology, 6:162, doi:10.3389/fendo.2015.00162.
Fit ellipsoid
Menu path Plugins > BoneJ > Fit ellipsoid.
Finds the ellipsoid that best fits a set of point or multi-point ROIs in the ROI Manager. Fit ellipsoid may fail to fit an ellipsoid. The more points you add, the more likely it is to succeed. Points are scaled to the spatial calibration (voxel widht, height & depth) of the input image.
Suitable images
A 3D image.
Parameters
- ROI Manager: ROIs with at least nine points in the ROI Manager.
Results
- Radii: the radii a, b and c of the fitted ellipsoid. Radius a is the shortest and c the longest.
- Centroid: x, y and z coordinates of the ellipsoid centre point.
Differences from BoneJ1
- Supports multi-point ROIs.
- Plug-in cancels if an ellipsoid can't be found, instead of reporting invalid results.
Fit sphere (WIP)
Menu path Plugins > BoneJ > Fit sphere.
Finds the sphere that best fits a set of point ROIs, and optionally displays the image data bounded by the sphere in a new image window. Place a set of point ROIs on structures of interest, hitting [T] to add each point to the ROI Manager. Fit Sphere takes the coordinates of the points from the ROI Manager and applies a least-squares optimisation.
Suitable images
A 3D image.
Parameters
- ROI Manager: populated with at least 5 point ROI's
- Copy Sphere: Create a new stack containing image data from within the best-fit sphere.
- Padding: Number of black pixels to put between the sphere and the sides of the image
- Inner Cube: Create a new stack containing image data from the cube that just fits inside the best-fit sphere.
- Outer Cube: Create a new stack containing image data from the cube that the best-fit sphere just fits inside.
- Crop Factor: Radius used for generating new images is multiplied by crop factor so that a bigger or smaller volume can be produced.
- Add to ROI Manager: Add the sphere to the ROI Manager as a set of circular ROIs
- Clear ROI Manager: Clear any existing ROIs in the Manager prior to adding circles
Results
- X Centroid: x-coordinate of sphere's centroid
- Y Centroid: y-coordinate of sphere's centroid
- Z Centroid: z-coordinate of sphere's centroid
- Radius: length of radius
- Images (optional): images containing a copy of the original data within the sphere, or within cubes bounding or bounded by the sphere.
Fractal dimension
Menu path Plugins > BoneJ > Fractal dimension.
This plug-in estimates the fractal dimension of an image by applying the box-counting algorithm. In this algorithm grids of diminishing size are scanned over the image, and the number of boxes containing at least one foreground voxel is counted. As the box size decreases and the grid becomes finer, the proportion of foreground boxes increases in a fractal structure. See Wikipedia for further details. BoneJ uses a fixed-grid scan, with an option to try to find the optimal covering.
The box counting algorithm produces a pair of values for each iteration it runs. Here n = number of boxes with foreground, and m = box size. These pairs are passed to a curve-fitting algorithm, which returns the slope of the linear function which describes them (regression fit). The coefficient of this slope is the fractal dimension.
Fractal dimension is markedly influenced by the parameters selected for the box counting algorithm, so it's worth running it several times with different values to find an accurate measure for your image.
Suitable images
A 2D or 3D binary image.
Parameters
- Starting box size (px): the size (sides) in pixels of a box in the sampling grid in the first iteration of the algorithm.
- Smallest box size (px): the minimum size in pixels of a box in the grid. When box size becomes smaller than this limit, the algorithm iterates one more time, and then stops.
- Box scaling factor: the term used to divide the box size after iteration. For example, a scaling factor of halves the size at each step.
- Grid translations: how many times at each iteration the grid is moved to try to the find the optimal covering. The optimal covering covers the objects in the image with the least amount of boxes. The larger the parameter the more likely it is that optimal covering is found. However, this slows down the plug-in considerably.
- Automatic parameters: if checked, then the plug-in runs with default parameters.
- Show points: if checked, then the plug-in displays the values it calculated.
Results
- Fractal dimension: the fractal dimension of the image. For example, the Koch snow flake has a fractal dimension of 1.262.
- R²: the coefficient of determination of the line fitted to the points.
The measures are reported separately for each 3D subspace in the image, i.e. for each channel and time frame.
Differences to BoneJ1
- Supports hyperstacks
- Algorithm parameters can be changed by the user.
Related publications
Fazzalari NL, Parkinson IH (1996), Fractal dimension and architecture of trabecular bone, J Pathol, 178: 100-5, doi:10.1002/(SICI)1096-9896(199601)178:1<100::AID-PATH429>3.0.CO;2-K.
Inter-trabecular angles
Menu path Plugins > BoneJ > Inter-trabecular Angles.
The plug-in was designed to analyse the angles between trabeculae of cancellous bone. First it calls Skeletonize3D to thin the input image (if necessary). Then it calls AnalyzeSkeleton, which creates a graph of the largest skeleton (by number of nodes) in the thinned image. The graph consists of nodes and the edges that connect them. Nodes are also known as vertices, and edges as branches. Roughly speaking the edges correspond to trabeculae and the nodes to the junction points, where trabeuculae meet.
The graph is often not a perfect representation of the trabecular network in the input image. Inter-trabecular angles offers many options to adjust the graph's topology and filter out artefacts that may obfuscate or skew the results. First it allows you to filter out nodes with too many or too few edges. Secondly it can be used to prune very short edges, which often do not represent actual trabeculae.
Pruning works differently for different types of edges. There are four kinds: outer, dead-end, inner and short. An outer edge doesn't interconnect different parts of a graph. In other words, one (and only one) of its endpoints connects to only one branch, i.e. the edge itself. In the figure the outer edge is colored black. A dead-end (blue) is an outer edge whose length is less than the minimum set by the user, i.e. it's a short, outer edge. An inner edge (green) connects to end points with more than one branch. A short edge is an inner edge, whose length is less than the set minimum. When a dead-end is pruned, it with its "lonely" end-point are removed from the graph. When a short edge is pruned, it and it's endpoints are removed, and a new node is placed at the midpoint of the former. This new node connects to all the branches the previous nodes connected to.
Inter-trabecular angles offers two further options to control pruning: iteration and clustering. Iteration repeats pruning until no new short edges are found. Sometimes pruning can create new short edges, and thus the graph may still have them after one iteration. However, iteration can alter the structure of the graph too dramatically. Clustering searches for all nodes connected by short edges, before removing any. In the figure, clustering pruning would remove the four nodes and the red edges between them in one go. It would create a new node at the center of the previous four, and connect it to the blue and green edges. When pruning is not clustering, it removes edges one-by-one. This changes the end result depending on the order the edges are traversed. Clustering creates the same result each time.
Pruning also removes loops and redundant parallel edges. The former connects to the same node on both ends, and the latter connects two nodes that are already connected by another edge.
The pruning and filtering features were added so that we can replicate and continue from the research of Reznikov et al.
Suitable images
An 8-bit, binary 2D or 3D image. Hyperstacks are not supported.
Parameters
- Minimum valence: minimum number of branches for a node to be included in the analysis.
- Maximum valence: maximum number of branches for a node to be included in the analysis.
- Minimum trabecular length (px): minimum length for a branch to be preserved in the pruning. Length is calculated as the distance between the endpoints of a branch.
- This length is also displayed in the units of the image calibration
- Margin (px): minimum distance of a node from image stack edges to be included in the analysis. Having nodes too close to the edges can make the results less accurate, because you get more branches that do not terminate to a node at the other end.
- Iterate pruning: repeat pruning until no more new short branches are discovered. When true, the topology of the graph is likely to change more in the pruning.
- Use clusters: if true then the pruning result is independent of the order in which the graph is traversed. False corresponds with methodology in Reznikov's article. See above for more details.
- Print centroids: Print the centroids (center coordinates) of the node pairs at the ends of each edge.
- Print % culled edges: Print statistics of different types of edges pruned.
Results
- Inter-trabecular angles: angles between each branch of each node included in the analysis. Sorted into columns according to the number of branches per node. For example, column "3" shows the angles between branches of nodes with three branches.
- Centroids (optional): A table of the center coordinates of the node pairs at the ends of each edge.
- Culled edge percentages (optional): A table showing the percentages of different kinds of edges pruned, compared to the total number of edges in the analysed graph.
- Skeleton (optional): if the plug-in had to skeletonise the input image, it displays the result of the thinning.
Differences to BoneJ1
- Inter-trabecular angles generalizes the idea of Triple point angles for any types of points. It also provides more tools for adjusting the graph for analysis.
Related publications
Reznikov, N et al. (2016), Inter-trabecular angle: A parameter of trabecular bone architecture in the human proximal femur that reveals underlying topological motifs, Acta Biomaterialia, 44: 65--72, doi:j.actbio.2016.08.040.
Local thickness
Menu path Plugins > BoneJ > Thickness.
This plug-in includes Local_Thickness in BoneJ, and provides some additional options & results. Local thickness measures the diameter of the largest sphere that fits inside the object and contains the point for each point i.e. foreground voxel in an image. The plug-in calculates mean and standard deviation of the trabecular thickness (Tb.Th) or trabecular spacing (Tb.Sp) directly from pixel values in the resulting thickness map. Foreground voxels are considered trabeculae, and background voxels are the spacing. Processing time is heavily dependent on feature size (in pixels); large features can take a very long time to process.
Suitable images
The input image must be 3D, 8-bit and binary. Hyperstacks are not supported.
Parameters
- Calculate: chooses which thickness maps to calculate - trabecular thickness, trabecular spacing, or both. In order to calculate trabecular spacing, the image voxels are inverted.
- Show thickness maps: display the calculated thickness maps or not.
- Mask thickness maps: remove artifacts from the thickness maps. Artifacts are foreground voxels not present in the original image.
- Crop to ROI manager: create thickness maps only from the area bounded by the ROIs in the ROI manager. Checking this option requires you've added ROIs to the ROI manager.
Results
- The mean and standard deviation for each thickness map calculated.
- Displays thickness map images if Show thickness maps was selected.
Differences to BoneJ1
- Calls the latest version of Local_Thickness.
- Thickness values for background voxels are marked NaN instead of 0.
Related publications
- Dougherty R, Kunzelmann K (2007), Computing local thickness of 3D structures with ImageJ, Microsc. Microanal., 13: 1678-1679, doi:10.1017/S1431927607074430
- Hildebrand T, Rüegsegger P (1997), A new method for the model-independent assessment of thickness in three-dimensional images, J. Microsc., 185: 67-75, doi:10.1046/j.1365-2818.1997.1340694.x
Moments of inertia (WIP)
Menu path: Plugins > BoneJ > Moments of Inertia
Calculates the three orthogonal principal axes and moments of inertia around those axes. It includes pixels with values between upper and lower limits, which can be defined in terms of unitless grey values or Hounsfield units (HU). It optionally creates a new stack with the image centred and rotated so that the principal axes are parallel to the image stack's x, y and z axes. Calculations are limited to a rectangular ROI if one is drawn. The plugin will guess whether the image is HU calibrated, and if so, apply HU limits of bone (0-4000 HU), otherwise it will calculate auto-thresholds based on the stack's histogram. If a calibration curve is known, the coefficients can be added to get weighted calculations. Aligning a bone with Moments of Inertia may be a useful step prior to Slice Geometry if bones are not aligned with the image z axis.
Suitable images
An 8-bit or 16-bit image.
Parameters
- Start slice: First slice to include in calculations
- End slice: Last slice to include in calculations
- HU Calibrated: Plugin will guess whether the image is HU calibrated. If image is HU calibrated, make sure the box is checked and enter HU calibrated numeric values in the following fields
- Bone Min: Lower threshold, in either uncalibrated greys or HU
- Bone Max: Upper threshold, in either uncalibrated greys or HU
- Slope: m where physical density = m × pixel value + c
- Y Intercept: c where physical density = m × pixel value + c
- Align result: Draw a new stack with the principal axes parallel to the image axes
- Show axes (2D): Draw the axes in white on the aligned image
- Show axes (3D): Display the stack and its principal axes in a 3D Viewer window
Results
- Image (optional): a copy of the input image centered and aligned with the principal axes
- Xc: Centroid x-coordinate (mass-weighted by calibrated density)
- Yc: Centroid y-coordinate
- Zc: Centroid z-coordinate
- Vol: Total volume of thresholded voxels
- Mass: Mass of bone, from pixel values and density calibration coefficients
- Icxx: Moment around x axis passing through centroid
- Icyy: Moment around y axis passing through centroid
- Iczz: Moment around z axis passing through centroid
- Icxy: Off-axis term for constructing inertia tensor
- Icxz: Off-axis term for constructing inertia tensor
- Icyz: Off-axis term for constructing inertia tensor
- I1: Moment around the shortest principal axis
- I2: Moment around the middle principal axis
- I3: Moment around the longest principal axis
- Verbose output in Log window
- Eigenvalues: Result of of eigenvalue decomposition. Moments of inertia
- Eigenvectors of principal axes: orientation of input image
- Inverse eigenvector matrix: used to map voxel positions in the aligned image back to voxel positions in the original image
- Optional 3D display of principal axes
Optimise threshold (WIP)
Menu path: Plugins > BoneJ > Optimise Threshold
Several histogram-based methods exist for automatic determination of threshold for binary segmentation, but in ImageJ these are currently limited to pixel values in a single slice. The result can be excluding high values in a stack that are higher than the highest value in the current slice. This plugin uses all the pixels in a stack to construct a histogram and uses ImageJ's built-in isodata algorithm to determine the threshold. It optionally tests values either side of the initial auto-threshold for connectivity, because connectivity is very sensitive to image noise. The plugin attempts to find the threshold that results in minimal connectivity. Purification, erosion and dilation can improve the connectivity estimate, so Purify is always called, and erosion and dilation are applied as part of a sequence: purify, erode, purify, dilate.
Suitable images
An 8-bit of 16-bit image
Parameters
- Threshold Only: Determine the threshold from the stack histogram only
- Apply Threshold: Replace the input image with a thresholded version
- Show Plot: Display a graph showing connectivity versus threshold
- Tests: Number of different thresholds to test for connectivity
- Range: Proportion of the initial threshold to test above and below initial thresholds
- Subvolume Size: Size of the volume to test for connectivity. Set small for a faster run and large to test the whole stack
- Erosion Cycles: Number of times to erode the stack after initial purification
- Dilation Cycles: Number of times to dilate the stack after secondary purification
Results
- Thresholded stack (optional)
- Plot of connectivity versus threshold (optional)
- Log of optimal threshold value
Orientation (WIP)
Menu path: Plugins > BoneJ > Orientation
Sets the direction in a 2D image, without rotating the image or changing it in any way. Slice Geometry (see below) uses Orientation to calculate diameter, second moments of area and section moduli around anatomic axes set by the user.
Suitable images
A 2D image.
Parameters
- Orientation: input field displays current orientation (clockwise from 12 o'clock) and takes keyboard input
- deg / rad: display and set orientation in degrees or radians
- Principal direction: the main direction, the head of which is displayed in red
- Secondary direction: the orthogonal direction
- Reflect: swap the labels on this axis
Results
- Orientation axes: draws the axes of the orientation on the image.
Purify (WIP)
Menu path: Plugins > BoneJ > Purify
Purify locates all particles in 3D and removes all but the largest foreground and background particles.
Suitable images
The input image must be 3D, 8-bit and binary.
Parameters
- Labelling algorithm:
- Mapped: Non-recursive, memory efficient and fast.
- Multithreaded: use multiple cores and job chunking to reduce recursion. Fast on small stacks and if you have many CPU cores.
- Linear: Non-recursive but heavy on RAM and single-threaded. Fast on big stacks, but only if you have the memory.
- Chunk Size: number of slices to use in each particle labelling thread. If images are large, set this to 2
- Performance Log: Show verbose performance information to help tune your system
- Make copy: If checked, shows the result in a new window; if unchecked the result replaces the original image.
Results
- Performance metrics (optional)
- Threads: Number of CPU cores used
- Slices: Number of slices in the input image stack
- Chunks: Number of chunks of slices, each chunk is processed independently
- Chunk size: Number of slices per chunk
- Last chunk size: size of the last chunk (the remainder chunk)
- Duration: time in seconds to complete purification
- Purified image: optionally in a new image window.
Skeletonise
Menu path Plugins > BoneJ >Skeletonise.
This plug-in simply includes Skeletonize3D in BoneJ. It adds some additional validation to check that your image suits the tool.
Suitable images
The input image must be 2D or 3D, 8-bit and binary. Hyperstacks are not supported.
Differences to BoneJ1
Calls the latest version of Skeletonize3D.
Slice geometry (WIP)
Menu path Plugins > BoneJ > Slice Geometry
Slice Geometry calculates cross-sectional geometric properties of shapes: cross-sectional area, centroid, mean density, second moment of area, section modulus, Feret diameter and local thickness (2D and 3D). Measurements can be limited to a rectangular ROI. If your bone is not well aligned with the image axes, you may find it useful to align the bone to its principal axes using Moments of Inertia or by exporting a transformed volume from the ImageJ 3D Viewer. Importantly, no assumption of geometry is made for any of the measurements.
Suitable images
A 2D or 3D binary image.
Parameters
- Bone: Slice Geometry will guess from your image title the bone it is working on. If it is wrong, correct it. If your bone of interest isn't listed, email me.
- 2D Thickness: Run Thickness on a per-slice basis; this fits circles rather than spheres
- 3D Thickness: Run Thickness on the whole stack, fitting spheres, then report results per slice
- Draw Axes: Draw axes on an annotated copy of the stack
- Draw Centroids: Draw centroids on an annotated copy of the stack
- Annotated Copy (2D): Create a new stack showing the centroids and principal axes
- 3D Annotation: Display the stack, principal axes and centroids in the 3D viewer
- Process Stack: Calculate parameters for all slices in the stack
- Clear Results: Remove all data in the results table without saving, prior to calculating parameters
- Use Orientation: Also calculate parameters based on directions defined in Orientation
- HU Calibrated: Allows you to enter your thresholds in Hounsfield units (HU) or uncalibrated units
- Bone Min: minimum pixel value to use in calculations
- Bone Max: maximum pixel value to use in calculations
- Slope: where physical density
- Y Intercept: where physical density
- Note: density-weighted calculations are only applied to centroid determination at present
- Partial volume compensation: Use model that assumes Gaussian blur of imaging modality and linear transform between pixel value and sample 'density' to correct for blurred and pixelated images (e.g. small bone in clinical CT)
- Background: pixel value that corresponds to zero bone density (could be the 'fat', 'air' or 'muscle' pixel value)
- Foreground: pixel value that corresponds to 100% bone density
- A rectangular ROI (optional): if there's a ROI, calculations are limited to its area.
Results
- Images (optional): displays the result images selected in the parameters
- Bone code: Unique numeric identifier for the anatomic name of each bone. Further bone codes can be added to BoneJ on request
- Slice: slice number indicating which slice contributed image data for this row of the results
- CSA: cross-sectional area
- X cent.: Centroid x-coordinate
- Y cent.: Centroid y-coordinate
- Density: mean physical density, calculated from pixel values and calibration coefficients
- wX cent: Density-weighted x-coordinate of centroid
- wY cent: Density-weighted y-coordinate of centroid
- Theta: angle of minor axis (axis for Imin, the long axis of your specimen's cross section) from the horizontal, ranging from to , with positive as clockwise
- R1: maximum chord length from minor axis
- R2: maximum chord length from major axis
- Imin: Second moment of area around major axis
- Imax: Second moment of area around minor axis
- Ipm: Product moment of area (= 0 if no errors are present, e.g. due to pixelation)
- Zmax: Section modulus around major axis (Imax / R2)
- Zmin: Section modulus around minor axis (Imin / R1)
- Zpol: Polar section modulus
- Feret Min: Minimum caliper width
- Feret Max: Maximum caliper width
- Feret Angle: Orientation of maximum caliper width
- Perimeter: Distance around external surface
- Max Thick 2D: Maximum thickness determined by local thickness in 2D
- Mean Thick 2D: Mean thickness determined by local thickness in 2D
- SD Thick 2D: Standard deviation of the mean thickness determined by local thickness in 2D
- Max Thick 3D: Maximum thickness in this slice determined by local thickness in 3D
- Mean Thick 3D: Mean thickness in this slice determined by local thickness in 3D
- SD Thick 3D: Standard deviation of the mean thickness in this slice determined by local thickness in 3D Directional measurements, using Orientation directions, and the specimen's slice centroid
- A (rad): Principal orientation (direction A)
- B (rad): Secondary orientation (direction B)
- IAa: Second moment of area around Aa axis
- IBb: Second moment of area around Bb axis
- ZAa: Section modulus around Aa axis
- ZBb: Section modulus around Bb axis
- RAa: maximum chord length from Aa axis
- RBb: maximum chord length from Bb axis
- DAa: Calliper diameter in direction of Aa
- DBb: Calliper diameter in direction of Bb
Surface area
Menu path Plugins > BoneJ > Surface area
Surface area creates a mesh from the bone in the image, and then calculates the area of the surface of the mesh. A mesh is a collection of triangular faces that defines the shape of an object in 3D graphics. The plug-in assumes that all foreground voxels represent bone.
Suitable images
A 3D binary image.
Parameters
- Export STL file(s): if checked, then the meshes created from the image are saved as .stl-files. A dialog opens for you to select a folder for the files.
Results
- Surface area: the surface area of the bone mesh
- STL-file: the mesh created from the bone image
The surface area is reported and an .stl-file saved separately for each 3D subspace in the image.
Differences to BoneJ1
- Supports hyperstacks.
- Results differ, because the marching cubes and mesh volume implementations are different.
- In BoneJ1 this plug-in was called Isosurface
Surface fraction
Menu path Plugins > BoneJ > Fraction > Surface fraction
Surface fraction calculates the fraction of bone volume in an image by comparing meshes created from bone particles and the whole image. A mesh is a collection of triangular faces that defines the shape of an object in 3D graphics. The plug-in assumes that all foreground voxels represent bone.
More formally defined, Surface fraction calculates the fraction BV/TV, which is the volume of mineralised bone BV per unit volume of the sample TV.
Suitable images
The input image must be 3D and binary.
Results
- Bone volume: volume of the mesh created from bone voxels.
- Total volume: volume of the mesh created from the whole image.
- Volume ratio: ratio of bone to total volume.
The measures are reported separately for each 3D subspace in the image, i.e. for each channel and time frame.
Differences to BoneJ1
- Supports hyperstacks.
- Results differ, because the marching cubes and mesh volume implementations are different.
- In BoneJ1 this plug-in was called Volume fraction
Results table
The BoneJ plug-ins print their results into a shared result table. This is because we often need to calculate several measures for the same image, so it's handy to have them on one row. Repeated measures for the same image are reported on different rows. The results persist even if the table is closed. To clear the table run Plugins > BoneJ > Table > Clear BoneJ results.
Note that some of the plug-ins (marked with WIP) still use a ImageJ1 style results table that works slightly differently. As they are modernized they'll move to use the same new table than others.
Where is my favorite plug-in?
We've decided to remove some plug-ins from BoneJ experimental. Interpolate ROIs, Neck shaft angle, Plateness and Structure model index have been discontinued. Dilate and Erode come pre-packaged with ImageJ, so there's no need to include them.
Support for Kontron IMG, Scanco ISQ and Stratec pQCT file formats has been moved to SCIFIO. Just run Edit > Options > ImageJ2, and check Use SCIFIO when opening files. When the option is enabled, these kinds of files can be opened from File > Open or dragging & dropping them like any other format.
Distribution analysis and other pQCT related tools can now be downloaded independently from the PQCT update site.
Licence
BoneJ experimental is free, open-source software. You can redistribute it and/or modify it under the terms of the BSD 2-clause license. The software is provided "as is" and any warranties are disclaimed. In no event shall the copyright holder or contributors be liable.
Citation
If you'd like to cite the software, we will soon publish a paper about BoneJ experimental. We recommend you cite the specific release used in your research.