User:Mim.cis/sandbox/Group-Actions-Manifolds-CA

Several Group Actions in CA

Main article: Computational Anatomy

Many different imaging modalities are being used various actions. For images such that ${\displaystyle I(x)}$  is a three-dimensional vector then

${\displaystyle \varphi \cdot I=(d\varphi \,I)\circ \varphi ^{-1},}$ 

${\displaystyle \varphi \star I=((d\varphi ^{T})^{-1}I)\circ \varphi ^{-1}}$ 

Cao et al. ^[1] examined actions for mapping MRI images measured via diffusion tensor imaging and represented via there principle eigenvector. For tensor fields a positively oriented orthonormal basis ${\displaystyle I(x)=(I_{1}(x),I_{2}(x),I_{3}(x))}$  of ${\displaystyle {\mathbb {R} }^{3}}$ , termed frames, vector cross product denoted ${\displaystyle I_{1}\times I_{2}}$  then

${\displaystyle \varphi \cdot I={\Big (}{\frac {d\varphi I_{1}}{\|d\varphi \,I_{1}\|}},{\frac {(d\varphi ^{T})^{-1}I_{3}\times d\varphi \,I_{1}}{\|(d\varphi ^{T})^{-1}I_{3}\times d\varphi \,I_{1}\|}},{\frac {(d\varphi ^{T})^{-1}I_{3}}{\|(d\varphi ^{T})^{-1}I_{3}\|}}{\Big )}\circ \varphi ^{-1}\ ,}$ 

The Fr\'enet frame of three orthonormal vectors, ${\displaystyle I_{1}}$  deforms as a tangent, ${\displaystyle I_{3}}$  deforms like a normal to the plane generated by ${\displaystyle I_{1}\times I_{2}}$ , and ${\displaystyle I_{3}}$ . H is uniquely constrained by the basis being positive and orthonormal.

For ${\displaystyle 3\times 3}$  non-negative symmetric matrices, an action would become ${\displaystyle \varphi \cdot I=(d\varphi \,Id\varphi ^{T})\circ \varphi ^{-1}}$ .

For mapping MRI DTI images^{[2] [3]} (tensors), then eigenvalues are preserved with the diffeomorphism rotating eigenvectors and preserves the eigenvalues. Given eigenelements ${\displaystyle \{\lambda _{i},e_{i},i=1,2,3\}}$ , then the action becomes

${\displaystyle \varphi \cdot I\doteq (\lambda _{1}{\hat {e}}_{1}{\hat {e}}_{1}^{T}+\lambda _{2}{\hat {e}}_{2}{\hat {e}}_{2}^{T}+\lambda _{3}{\hat {e}}_{3}{\hat {e}}_{3}^{T})\circ \varphi ^{-1}}$ 

${\displaystyle {\hat {e}}_{1}={\frac {d\varphi e_{1}}{\|d\varphi e_{1}\|}}\ ,{\hat {e}}_{2}={\frac {d\varphi e_{2}-\langle {\hat {e}}_{1},(d\varphi e_{2}\rangle {\hat {e}}_{1}}{\|d\varphi e_{2}-\langle {\hat {e}}_{1},(d\varphi e_{2}\rangle {\hat {e}}_{1}\|}}\ ,\ {\hat {e}}_{3}\doteq {\hat {e}}_{1}\times {\hat {e}}_{2}\ .}$ 

1. Cao Y1, Miller MI, Winslow RL, Younes, Large deformation diffeomorphic metric mapping of vector fields. IEEE Trans Med Imaging. 2005 Sep;24(9):1216-30.
2. Alexander, D. C.; Pierpaoli, C.; Basser, P. J.; Gee, J. C. (2001-11-01). "Spatial transformations of diffusion tensor magnetic resonance images". IEEE transactions on medical imaging. 20 (11): 1131–1139. doi:10.1109/42.963816. ISSN 0278-0062. PMID 11700739.
3. Cao, Yan; Miller, Michael I.; Mori, Susumu; Winslow, Raimond L.; Younes, Laurent (2006-07-05). "Diffeomorphic Matching of Diffusion Tensor Images". Proceedings / CVPR, IEEE Computer Society Conference on Computer Vision and Pattern Recognition. IEEE Computer Society Conference on Computer Vision and Pattern Recognition. 2006: 67. doi:10.1109/CVPRW.2006.65. ISSN 1063-6919. PMC 2920614. PMID 20711423.