Post on 31-Dec-2015
description
Visualizing Diffusion Tensor Imaging Data with Merging Ellipsoids
Wei Chen, Zhejiang UniversitySong Zhang, Mississippi State University
Stephen Correia, Brown UniversityDavid Tate, Harvard University
22 April 2009, Beijing
Background• Diffusion Tensor Imaging (DTI)
– Water diffusion in biological tissues.
– Indirect information about the integrity of the underlying white matter.
Diffusion Tensors
Primary diffusion direction
1321
3
2
1
3211 )()(
eeeeeeEE
DDD
DDD
DDD
D
zzzyzx
yzyyyx
xzxyxx
)(max)(3
1k
kiii reigenvectoe
Fractional anisotropy
• Degree of anisotropy
-represents the deviation from
isotropic diffusion
10)()()(
2
3
3:
23
22
21
23
22
21
321
FA
let
Tensor at (155,155,30)
Diffusion tensor:
10^(-3)* 0.5764 -0.3668 0.1105 -0.3668 0.8836 -0.1152 0.1105 -0.1152 0.8373
Eigenvalue= 0.0003 0.0008 0.0012Eigenvector: 0.8375 -0.1734 0.5182 0.5432 0.3669 -0.7552 -0.0592 0.9140 0.4015
Primary diffusion direction: (0.5182 -0.7552 0.4015)
FA at (155,155,30)
Diffusion tensor:
10^(-3)* 0.5764 -0.3668 0.1105 -0.3668 0.8836 -0.1152 0.1105 -0.1152 0.8373
Eigenvalue= 0.0003 0.0008 0.0012
FA = 0.5133
Tensor Displayed as Ellipsoid
λ1 = λ2 = λ3 λ1 > λ2 > λ3 λ1 > λ2 = λ3
isotropic anisotropic
Eigenvectors define alignment of axes
Courtesy: G. Kindlmann
• Integral Curves– Show topography– Lost information because
a tensor is reduced to a vector
– Error accumulates over curves
• Glyphs– Shows entire diffusion tensor
information– Topography information may
be lost or difficult to interpret– Too many glyphs visual
clutter; too few poor representation
Our contributions
• A merging ellipsoid method for DTI visualization.– Place ellipsoids on the paths of DTI integral curves.– Merge them to get a smooth representation
• Allows users to grasp both white matter topography/connectivity AND local tensor information.– Also allows the removal of ellipsoids by using the
same method used to cull redundant fibers.
Methods1) Compute diffusion tensors:
2) Compute integral curves:
p(0) = the initial point
e1 = major vector field
p(t) = generated curve
Methods
4) Construct a metaball function:
R = truncation radius, si is the center of the ith ellipitical function. a = −4:0/9:0; b = 17:0/9:0; c = −22:0/9:0.
3) Sampling an integral curve, and place an elliptical function at each si :
Streamball method [Hagen1995] employs spherical functions
λ1 = λ2 = λ3, e1 = e2 = e3
Methods
5) Define a scalar influence field:
6) The merging ellipsoids representation denotes an isosurface extracted from a scalar influence field F(S; x)
Methods
Visualizing eight diffusion tensors along an integral curve with (a) glyphs, (b) standard spherical streamballs [Hagen1995], and (c) merging ellipsoids
Parameters
• The degree of merging or separation depends on three factors.
• 1st: the iso-value C adjusted interactively– Shows merging or un-merging
• 2nd: the truncation radius R
• 3rd: the placement of the ellipsoids.– Currently, uniform sampling
Parameters
Visualizing eight diffusion tensors with different iso-values: (a) 0.01, (b) 0.25, (c) 0.51, (d) 0.75, (e) 0.85, (f) 0.95. The truncation radius R is 1.0.
Parameters
The results with different truncation radii: (a) 0.3, (b) 0.5, (c) 1.0. In all cases, the iso-value is 0.5.
Properties
• The entire merging ellipsoid representation is smooth.
• A diffusion tensor produces one elliptical surface.
• When two diffusion tensors are close, their ellipsoids tend to merge smoothly. If they coincide, a larger ellipsoid is generated.
• Provide iso-value parameters for users to interactively change sizes of ellipsoids.– Larger: ellipsoids merge with neighbors and provide a sense of
connectivity
– Smaller: provide better sense of individual tensors but has limited connectivity information
Comparison
• If the three eigenvectors are set as identical, our method becomes the standard streamball approach.
• If a sequence of ellipsoids are continuously distributed along an integral curve, the hyperstreamline representation is yielded.
• An individual elliptical function can be extended into other superquadratic functions, yielding the glyph based DTI visualization representation.
Experiments• Scalar field pre-computed
– Running time dependent on the grid resolution and number of tensors
– Construction costs 15 minutes to 150 minutes with the volume dimension of 2563.
• Visualization of ellipsoids done interactively– Reconstruction of isosurface takes 0.5 seconds using un-
optimized software implementation.
Experiments
• DTI data from adult healthy control participant (age > 55).
• DTI protocol: – b = 0, 1000 mm/s2
– 12 directions– 1.5 Tesla Siemens
• Experimental results performed on laptop P4 2.2 GHz CPU & 2G host memory.
• Box = 34mm3
• Minimum path distance = 1.7mm
• Anatomic structures and relationships between tensors
axial
sagittal coronal
coronalcoronal
sagittalsagittal
axialaxial
• Box = 17mm3
• Min path distance = 3.4mm
• b = streamtubes
• c = ellipsoids
• d = merging ellipsoids
• Note greater detail in d
coronalcoronal
sagittalsagittal
axialaxial
• Same ROI
• Different iso-values• a = 0.90• b = 0.80• c = 0.60• d = 0.40
• Different emphases on local diffusion tensor info vs. connectivity info
• Forceps major• Box = 17mm3
• Min path distance = 3.4mm
• Renderings• b = streamtubes• c = ellipsoids• d = merging ellipsoids
• More isotropic tensors vs. corpus callosum
• Change from high to low anisotropy on same fiber seen with merging ellipsoid method
axialaxial
• Differences between tensors on a single curve.
• Blue = more anisotropic
• Red = more isotropic
• Improves ability to identify problematic fibers or problematic sections on a curve
Evaluation
• Identify regions within a fiber that has low anisotropy and thus might be problematic.– Normal anatomy (e.g., crossing fibers)?– Injured?– At risk?
• Adjunct to conventional quantitative tractography methods
Evaluation• Adjunct to conventional
quantitative tractography methods
• Activate merging ellipsoids after tract selection to visually evaluate and select fibers with low or high anisotropy, even if length is same
• Group comparison and statistical correlation with cognitive and/or behavioral measures
• May reveal effects otherwise masked by larger number of normal fibers in the tract-of-interest
Conclusions
• A simple method for simultaneous visualization of connectivity and local tensor information in DTI data.
• Interactive adjustment to enhance information about local anisotropy.– Full spectrum from individual glyphs to
continuous curves
Future Directions• Statistical tests
– Cingulum bundle in vascular cognitive impairment
• Association with apathy?
– Circularity?• Select fibers at risk based on visual inspection and
then enter into statistical models?
• Intra-individual variability
• Inter-individual variability– Interhemispheric differences
Acknowledgements• This work is partially supported by NSF of
China (No.60873123), the Research Initiation Program at Mississippi State University.
Distance between integral curves
s = The arc length of shorter curves0, s1 = starting & end points of sdist(s) = shortest distance from location s on the shorter curve to the longer curve.Tt ensures two trajectories labeled different if they differ significantly over any portion of the arc length.