Difference between revisions of "Projects:GeodesicTractographySegmentation"

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  Back to [[NA-MIC_Collaborations|NA-MIC_Collaborations]]
 
  Back to [[NA-MIC_Collaborations|NA-MIC_Collaborations]]
  
'''Objective:'''r
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'''Objective:'''
  
 
The purpose of this work is to extract white matter tracts and volumetric fiber bundles from Diffusion-Weighted MRI (DW-MRI) in order to study clinically relevant outcomes related to these structures. The idea is to use directional information in an anisotropic energy functional based on the Finsler metric (remember that the Riemannian metric is one particular Finsler metric of interest) in order to extract the best geodesic (i.e. optimal) path, which we dub "the anchor tract", between two regions of interest.  Subsequently, region-based active contours are used to segment the associated volumetric fiber bundle.  Finally, statistics are computed along both the anchor tract and the volumetric fiber bundle which may be used to compare different clinical populations.
 
The purpose of this work is to extract white matter tracts and volumetric fiber bundles from Diffusion-Weighted MRI (DW-MRI) in order to study clinically relevant outcomes related to these structures. The idea is to use directional information in an anisotropic energy functional based on the Finsler metric (remember that the Riemannian metric is one particular Finsler metric of interest) in order to extract the best geodesic (i.e. optimal) path, which we dub "the anchor tract", between two regions of interest.  Subsequently, region-based active contours are used to segment the associated volumetric fiber bundle.  Finally, statistics are computed along both the anchor tract and the volumetric fiber bundle which may be used to compare different clinical populations.
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''Fiber Tractography''
 
''Fiber Tractography''
  
The goal of fiber tractography is to find open curves (i.e. paths without volume) in the white matter which correspond to something anatomically significant (see [[ Algorithm:GATech:DWMRI_Birds_Eye_View | DW-MRI Bird's Eye View]]).
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The goal of fiber tractography is to find open curves (i.e. paths without volume) in the white matter which correspond to something anatomically significant (see ).
  
 
In our  
 
In our  
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* [[Media:2007_Project_Half_Week_FinslerTractography.ppt| 4-block PPT Jan 2007]]
 
* [[Media:2007_Project_Half_Week_FinslerTractography.ppt| 4-block PPT Jan 2007]]
 
* [[Projects/Diffusion/2007_Project_Week_Geodesic_Tractography| June 2007 Project Week]]
 
* [[Projects/Diffusion/2007_Project_Week_Geodesic_Tractography| June 2007 Project Week]]
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For some additional diffusion-related thoughts, see:  [[Algorithm:GATech:DWMRI_Birds_Eye_View | DW-MRI Bird's Eye View]].

Revision as of 20:03, 25 July 2007

Home < Projects:GeodesicTractographySegmentation
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Objective:

The purpose of this work is to extract white matter tracts and volumetric fiber bundles from Diffusion-Weighted MRI (DW-MRI) in order to study clinically relevant outcomes related to these structures. The idea is to use directional information in an anisotropic energy functional based on the Finsler metric (remember that the Riemannian metric is one particular Finsler metric of interest) in order to extract the best geodesic (i.e. optimal) path, which we dub "the anchor tract", between two regions of interest. Subsequently, region-based active contours are used to segment the associated volumetric fiber bundle. Finally, statistics are computed along both the anchor tract and the volumetric fiber bundle which may be used to compare different clinical populations.

Progress:

Fiber Tractography

The goal of fiber tractography is to find open curves (i.e. paths without volume) in the white matter which correspond to something anatomically significant (see ).

In our

We are continuing to work on our new framework for white matter tractography in high angular resolution diffusion data. We base our work on concepts from Finsler geometry. Namely, a direction-dependent local cost is defined based on the diffusion data for every direction on the unit sphere. Minimum cost curves are determined by solving the Hamilton-Jacobi-Bellman using the Fast Sweeping algorithm. Classical costs based on the diffusion tensor field can be seen as a special case. While the minimum cost (or equivalently the travel time of a particle moving along the curve) and the anisotropic front propagation frameworks are related, front speed is related to particle speed through a Legendre transformation which can severely impact anisotropy information for front propagation techniques. Implementation details and results on high angular diffusion data show that this method can successfully take advantage of the increased angular resolution in high b-value diffusion weighted data despite lower signal to noise ratio.

Fiber Bundle Segmentation

We have developed a locally-constrained region-based approach which, when initialized on the fiber tracts, is able to provide volumetric fiber segmentations of the full diffusion bundles.

Data

We are using Harvard's high angular resolution datasets which currently consist of a population of 12 schizophrenics and 12 normal controls.

Visual Results

Recently, we have applied this method to the cingulum bundle, as shown in the following images:


Fig 1. Results on Cingulum Bundle
Detailed View of the Cingulum Bundle Anchor Tract
Streamline Comparison
Anterior View of the Cingulum Bundle Anchor Tract
Posterior View of the Cingulum Bundle Anchor Tract

Previously, this method was applied to full brain fiber tractography, as shown in the following images:

Fig 2. Results on full brain fiber tractograpy
Fiber tracking from high resolution data set.
Comparison of technique with streamline based on tensor field.


This method may also be used in pattern detection applications, such as vessel segmentation:

Fig 3. Results on Vessel Segmentation
Vessel Segmentation

Statistical Results

We are currently investigating Cingulum Bundle fractional anisotropy (FA) differences between a population of 12 schizophrenics and 12 normal controls. We find the anchor tracts as described above and then compute statistics for FA inside a tube of radii 1-3mm centered on the anchor tract. So far using this method we have been unable to find a statistical difference between the normal controls and the schizophrenics. Therefore, we are investigating a more precise extraction of the cingulum bundle using Finsler Levelsets, rather than using the primitive cylinder as is currently done.

Download the current statistical results here.‎ (last updated 18/Apr/2007)


Project Status

  • Working 3D implementation in Matlab using the C-based Mex functions.
  • Currently porting to ITK.

References:

  • V. Mohan, J. Melonakos, M. Niethammer, M. Kubicki, and A. Tannenbaum. Finsler Level Set Segmentation for Imagery in Oriented Domains. BMVC 2007. Under review.
  • J. Melonakos, V. Mohan, M. Niethammer, K. Smith, M. Kubicki, and A. Tannenbaum. Finsler Tractography for White Matter Connectivity Analysis of the Cingulum Bundle. MICCAI 2007. Under review.
  • J. Melonakos, E. Pichon, S. Angenet, and A. Tannenbaum. Finsler Active Contours. IEEE Transactions on Pattern Analysis and Machine Intelligence, to appear in 2007.
  • E. Pichon and A. Tannenbaum. Curve segmentation using directional information, relation to pattern detection. In IEEE International Conference on Image Processing (ICIP), volume 2, pages 794-797, 2005.
  • E. Pichon, C-F Westin, and A. Tannenbaum. A Hamilton-Jacobi-Bellman approach to high angular resolution diffusion tractography. In International Conference on Medical Image Computing and Computer Assisted Intervention (MICCAI), pages 180-187, 2005.

Key Investigators:

  • Georgia Tech: John Melonakos, Vandana Mohan, Sam Dambreville, Allen Tannenbaum
  • Harvard/BWH: Marek Kubicki, Marc Niethammer, Kate Smith, C-F Westin, Martha Shenton

Links:

For some additional diffusion-related thoughts, see: DW-MRI Bird's Eye View.