Difference between revisions of "Algorithm:MGH"
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== [[Algorithm:MGH:Development:TopologyCorrection|Topology Correction]] == | == [[Algorithm:MGH:Development:TopologyCorrection|Topology Correction]] == | ||
− | Geometrically-Accurate Topology-Correction of Cortical Surfaces using Non-Separating Loops. | + | Geometrically-Accurate Topology-Correction of Cortical Surfaces using Non-Separating Loops. We propose a technique to accurately correct |
− | + | the spherical topology of cortical surfaces. Specifically,we construct | |
+ | a mapping from the original surface onto the sphere to detect | ||
+ | topological defects as minimal nonhomeomorphic regions. The | ||
+ | topology of each defect is then corrected by opening and sealing | ||
+ | the surface along a set of nonseparating loops that are selected in | ||
+ | a Bayesian framework. The proposed method is a wholly self-contained | ||
+ | topology correction algorithm, which determines geometrically | ||
+ | accurate, topologically correct solutions based on the magnetic | ||
+ | resonance imaging (MRI) intensity profile and the expected | ||
+ | local curvature. Applied to real data, our method provides topological | ||
+ | corrections similar to those made by a trained operator. | ||
<font color="red">'''New: '''</font> IEEE TRANSACTIONS ON MEDICAL IMAGING, VOL. 26, NO. 4, APRIL 2007 | <font color="red">'''New: '''</font> IEEE TRANSACTIONS ON MEDICAL IMAGING, VOL. 26, NO. 4, APRIL 2007 | ||
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== [[Algorithm:MGH:FreeSurferNumericalRecipiesReplacement|Numerical Recipies Replacement]] == | == [[Algorithm:MGH:FreeSurferNumericalRecipiesReplacement|Numerical Recipies Replacement]] == |
Revision as of 14:05, 28 November 2007
Home < Algorithm:MGHBack to NA-MIC Algorithms
Overview of MGH Algorithms
A brief overview of the MGH's algorithms goes here. This should not be much longer than a paragraph. Remember that people visiting your site want to be able to understand very quickly what you're all about and then they want to jump into your site's projects. The projects below are organized into a two column table: the left column is for representative images and the right column is for project overviews. The number of rows corresponds to the number of projects at your site. Put the most interesting and relevant projects at the top of the table. You do not need to organize the table according to subject matter (i.e. do not group all segmentation projects together and all DWI projects together).
MGH Projects
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QDEC: An easy to use GUI for group morphometry studiesCompare the primary eigendirection in two groups to see if they are the same.More... New: Put something new here. See: Qdec user page |
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Adding NRRD I/O to FreesurferOur objective is to open a NRRD volume in FreeSurfer, and convert an MGH volume to a NRRD volume with Freesurfer. This project allows the seemless exchange of diffusion-based volumetric data between Slicer and the FreeSurfer analysis stream, including tensors, eigendirections, as well as raw muli-direction diffusion data. More... Spherical WaveletsCortical Surface Shape Analysis Based on Spherical Wavelets. We introduce the use of over-complete spherical wavelets for shape analysis of 2D closed surfaces. Bi-orthogonal spherical wavelets have been proved to be powerful tools in the segmentation and shape analysis of 2D closed surfaces, but unfortunately they suffer from aliasing problems and are therefore not invariant to rotation of the underlying surface parameterization. In this paper, we demonstrate the theoretical advantage of over-complete wavelets over bi-orthogonal wavelets and illustrate their utility on both synthetic and real data. In particular, we show that the over-complete spherical wavelet transform enjoys significant advantages for the analysis of cortical folding development in a newborn dataset.New: IEEE TRANSACTIONS ON MEDICAL IMAGING, VOL. 26, NO. 4, APRIL 2007 |
File:Overcomplete vs biorthogonal wavelets.tif |
Topology CorrectionGeometrically-Accurate Topology-Correction of Cortical Surfaces using Non-Separating Loops. We propose a technique to accurately correct the spherical topology of cortical surfaces. Specifically,we construct a mapping from the original surface onto the sphere to detect topological defects as minimal nonhomeomorphic regions. The topology of each defect is then corrected by opening and sealing the surface along a set of nonseparating loops that are selected in a Bayesian framework. The proposed method is a wholly self-contained topology correction algorithm, which determines geometrically accurate, topologically correct solutions based on the magnetic resonance imaging (MRI) intensity profile and the expected local curvature. Applied to real data, our method provides topological corrections similar to those made by a trained operator. New: IEEE TRANSACTIONS ON MEDICAL IMAGING, VOL. 26, NO. 4, APRIL 2007
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Numerical Recipies ReplacementOur obejective is to replace algorithms using proprietary numerical recipes in FreeSurfer in efforts to open source FreeSurfer. More... New: Completed | |
File:Placeholder.png |
Atlas Renormalization for Improved Brain MR Image Segmentation across Scanner PlatformsAtlas-based approaches have demonstrated the ability to automatically identify detailed brain structures from 3-D magnetic resonance (MR) brain images. Unfortunately, the accuracy of this type of method often degrades when processing data acquired on a different scanner platform or pulse sequence than the data used for the atlas training. In this paper, we improve the performance of an atlas-based whole brain segmentation method by introducing an intensity renormalization procedure that automatically adjusts the prior atlas intensity model to new input data. Validation using manually labeled test datasets has shown that the new procedure improves the segmentation accuracy (as measured by the Dice coefficient) by 10% or more for several structures including hippocampus, amygdala, caudate, and pallidum. The results verify that this new procedure reduces the sensitivity of the whole brain segmentation method to changes in scanner platforms and improves its accuracy and robustness, which can thus facilitate multicenter or multisite neuroanatomical imaging studies. More... New: IEEE TRANSACTIONS ON MEDICAL IMAGING, VOL. 26, NO. 4, APRIL 2007 |