Difference between revisions of "Projects:ShapeAnalysisWithOvercompleteWavelets"

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Revision as of 12:18, 20 May 2008

Home < Projects:ShapeAnalysisWithOvercompleteWavelets

Back to NA-MIC Collaborations, MIT Algorithms

In this work, we extend the Euclidean wavelets to the sphere. The resulting over-complete spherical wavelets are invariant to the rotation of the spherical image parameterization. We apply the over-complete spherical wavelet to cortical folding development and show significantly consistent results as well as improved sensitivity compared with the previously used bi-orthogonal spherical wavelet. In particular, we are able to detect developmental asymmetry in the left and right hemispheres.

Description

Bi-orthogonal spherical wavelets have been shown to be powerful tools in the segmentation and shape analysis of 2D closed surfaces [1,2], but unfortunately they suffer from aliasing problems and are therefore not invariant under rotations of the underlying surface parameterization. See the toy example in the figure below.

Bump on the sphere (left side). When the north pole is right under the bump, both the bi-orthogonal and overcomplete wavelets detect the bump (first column on the right). When the north pole is rotated away from the bump, only the overcomplete wavelet detects the bump (second column on the right).

Instead, we propose to use the over-complete spherical wavelets. These over-complete spherical wavelets are based on filter bank theory, directly extending the ideas of Euclidean steerable pyramid to the sphere. We demonstrate the theoretical advantage of over-complete wavelets over bi-orthogonal wavelets. We also show that over-complete spherical wavelets allow us to build more stable cortical folding development models, and detect a wider array of regions of folding development in a newborn dataset. The use of spherical wavelet transform in cortical shape analysis allows us to study cortical folds of different spatial scales, which are difficult to analyze by cortical folding analysis methods based on local features such as curvature and sulcal depth measurements.

Experimental Results

Comparison with Bi-orthogonal Wavelets

The two images on the left of the figure below show the cortical folding speed detected by the bi-orthogonal wavelets. Notice, how the detection changes wildly with different parameterizations. On the other hand, the results of over-complete wavelets are stable across different parameterizations. Furthermore, the over-complete wavelets are much more sensitive than the bi-orthogonal wavelets in detecting changes.

Bi-orthogonal wavelets: Original Parameterization
Bi-orthogonal wavelets: Different Parameterization
Over-complete wavelets: Original Parameterization
Over-complete wavelets: Different Parameterization

Global Shape Analysis

We observe that the age of fastest growth decreases with the size of cortical folds, that is, larger folds grow earlier. This is consistent with the previous postmortem study[3].

Maximum growth rate (1/week) for each wavelet scale
Age (weeks) of fastest growth for each wavelet scale


Local Shape Analysis [1] P. Yu, P. E. Grant, Y. Qi, X. Han, F. Segonne, R. Pienaar, E. Busa, J. Pacheco, N. Makris, R. Buckner, P. Golland and B. Fischl, "Cortical surface shape analysis based on spherical wavelets," IEEE Transaction on Medical Imaging, vol. 26, pp. 582-97, 2007.

[2] D. Nain, S. Haker, A. Bobick, and A. Tannenbaum, "Multiscale 3-d shape representation and segmentation using spherical wavelets," IEEE Transaction on Medical Imaging, vol. 26, pp. 598-618, 2007.

[3] J. Chi, E. Dooling and F. Gilles, "Gyral development of the human brain", Annuals of Neurology, 1997.

Key Investigators

  • MIT Algorithms: [| B.T. Thomas Yeo], Peng Yu, Wanmei Ou, Ellent Grant, Bruce Fischl, Polina Golland

Publication

In Press

  • B.T.T. Yeo, P. Yu, P.E. Grant, B. Fischl, P. Golland. Shape Analysis with Overcomplete Spherical Wavelets. Accepted to MICCAI 2008.

In Print