A Fuzzy, Nonparametric Segmentation Framework for DTI and MRI Analysis: With Applications to DTI-Tract Extraction

This paper presents a novel fuzzy-segmentation method for diffusion tensor (DT) and magnetic resonance (MR) images. Typical fuzzy-segmentation schemes, e.g., those based on fuzzy C means (FCM), incorporate Gaussian class models that are inherently biased towards ellipsoidal clusters characterized by a mean element and a covariance matrix. Tensors in fiber bundles, however, inherently lie on specific manifolds in Riemannian spaces. Unlike FCM-based schemes, the proposed method represents these manifolds using nonparametric data-driven statistical models. The paper describes a statistically-sound (consistent) technique for nonparametric modeling in Riemannian DT spaces. The proposed method produces an optimal fuzzy segmentation by maximizing a novel information-theoretic energy in a Markov-random-field framework. Results on synthetic and real, DT and MR images, show that the proposed method provides information about the uncertainties in the segmentation decisions, which stem from imaging artifacts including noise, partial voluming, and inhomogeneity. By enhancing the nonparametric model to capture the spatial continuity and structure of the fiber bundle, we exploit the framework to extract the cingulum fiber bundle. Typical tractography methods for tract delineation, incorporating thresholds on fractional anisotropy and fiber curvature to terminate tracking, can face serious problems arising from partial voluming and noise. For these reasons, tractography often fails to extract thin tracts with sharp changes in orientation, such as the cingulum. The results demonstrate that the proposed method extracts this structure significantly more accurately as compared to tractography.

[1]  Zhizhou Wang,et al.  DTI segmentation using an information theoretic tensor dissimilarity measure , 2005, IEEE Transactions on Medical Imaging.

[2]  Suyash P. Awate,et al.  A fuzzy, nonparametric segmentation framework for DTI and MRI analysis: with applications to DTI-tract extraction. , 2007, IEEE transactions on medical imaging.

[3]  Suyash P. Awate,et al.  Unsupervised Texture Segmentation with Nonparametric Neighborhood Statistics , 2006, ECCV.

[4]  Suyash P. Awate,et al.  Adaptive, Nonparametric Markov Modeling for Unsupervised, MRI Brain-Tissue Classification , 2006 .

[5]  Nicholas Ayache,et al.  Fast and Simple Calculus on Tensors in the Log-Euclidean Framework , 2005, MICCAI.

[6]  John W. Fisher,et al.  Submitted to Ieee Transactions on Image Processing a Nonparametric Statistical Method for Image Segmentation Using Information Theory and Curve Evolution , 2022 .

[7]  Susumu Mori,et al.  Three-Dimensional Diffusion Tensor Magnetic Resonance Microimaging of Adult Mouse Brain and Hippocampus , 2002, NeuroImage.

[8]  Xinhua Zhuang,et al.  Gaussian mixture density modeling, decomposition, and applications , 1996, IEEE Trans. Image Process..

[9]  W. Eric L. Grimson,et al.  Interface Detection in Diffusion Tensor MRI , 2004, MICCAI.

[10]  Bruno Pelletier Kernel density estimation on Riemannian manifolds , 2005 .

[11]  W. Boothby An introduction to differentiable manifolds and Riemannian geometry , 1975 .

[12]  Xavier Bresson,et al.  A level set method for segmentation of the thalamus and its nuclei in DT-MRI , 2007, Signal Process..

[13]  David E. Breen,et al.  Level Set Modeling and Segmentation of DT-MRI Brain Data , 2001 .

[14]  L. Concha,et al.  Diffusion tensor tractography of the limbic system. , 2005, AJNR. American journal of neuroradiology.

[15]  Xavier Bresson,et al.  White matter fiber tract segmentation in DT-MRI using geometric flows , 2005, Medical Image Anal..

[16]  I. Miller Probability, Random Variables, and Stochastic Processes , 1966 .

[17]  R. A. Gaskins,et al.  Nonparametric roughness penalties for probability densities , 2022 .

[18]  Pierpaolo D'Urso,et al.  Fuzzy unsupervised classification of multivariate time trajectories with the Shannon entropy regularization , 2006, Comput. Stat. Data Anal..

[19]  Suyash P. Awate,et al.  Adaptive Markov modeling for mutual-information-based, unsupervised MRI brain-tissue classification , 2006, Medical Image Anal..

[20]  Manabu Kinoshita,et al.  Fiber-tracking does not accurately estimate size of fiber bundle in pathological condition: initial neurosurgical experience using neuronavigation and subcortical white matter stimulation , 2005, NeuroImage.

[21]  S. Geman,et al.  Nonparametric Maximum Likelihood Estimation by the Method of Sieves , 1982 .

[22]  Rachid Deriche,et al.  Level Set and Region Based Surface Propagation for Diffusion Tensor MRI Segmentation , 2004, ECCV Workshops CVAMIA and MMBIA.

[23]  Matthew P. Wand,et al.  Kernel Smoothing , 1995 .

[24]  Nicholas Ayache,et al.  Geometric Means in a Novel Vector Space Structure on Symmetric Positive-Definite Matrices , 2007, SIAM J. Matrix Anal. Appl..

[25]  James A. Sethian,et al.  Level Set Methods and Fast Marching Methods , 1999 .

[26]  S. Geman,et al.  Consistent Cross-Validated Density Estimation , 1983 .

[27]  D. Tuch Q‐ball imaging , 2004, Magnetic resonance in medicine.

[28]  David E. Breen,et al.  Level set modeling and segmentation of diffusion tensor magnetic resonance imaging brain data , 2003, J. Electronic Imaging.

[29]  David E. Breen,et al.  Level Set Segmentation and Modeling of DT-MRI human brain data , 2003 .

[30]  Zhizhou Wang,et al.  Tensor Field Segmentation Using Region Based Active Contour Model , 2004, ECCV.

[31]  David W. Scott,et al.  Monte Carlo Study of Three Data-Based Nonparametric Probability Density Estimators , 1981 .

[32]  David S Tuch,et al.  Automatic segmentation of thalamic nuclei from diffusion tensor magnetic resonance imaging , 2003, NeuroImage.

[33]  Stan Z. Li,et al.  Markov Random Field Modeling in Computer Vision , 1995, Computer Science Workbench.

[34]  Koenraad Van Leemput,et al.  Automated model-based tissue classification of MR images of the brain , 1999, IEEE Transactions on Medical Imaging.

[35]  W. Eric L. Grimson,et al.  Adaptive Segmentation of MRI Data , 1995, CVRMed.

[36]  Singiresu S. Rao Engineering Optimization : Theory and Practice , 2010 .

[37]  Carl-Fredrik Westin,et al.  Segmentation of Thalamic Nuclei from DTI Using Spectral Clustering , 2006, MICCAI.

[38]  J. Simonoff Smoothing Methods in Statistics , 1998 .

[39]  John G. Proakis,et al.  Probability, random variables and stochastic processes , 1985, IEEE Trans. Acoust. Speech Signal Process..

[40]  James C. Bezdek,et al.  Pattern Recognition with Fuzzy Objective Function Algorithms , 1981, Advanced Applications in Pattern Recognition.

[41]  E. Parzen On Estimation of a Probability Density Function and Mode , 1962 .

[42]  Susumu Mori,et al.  Fiber tracking: principles and strategies – a technical review , 2002, NMR in biomedicine.

[43]  Fei Wang,et al.  Asymmetry analysis of cingulum based on scale‐invariant parameterization by diffusion tensor imaging , 2005, Human brain mapping.

[44]  Shigeo Abe DrEng Pattern Classification , 2001, Springer London.

[45]  Peter Hall,et al.  Cross-validation in density estimation , 1982 .

[46]  Anil K. Jain Fundamentals of Digital Image Processing , 2018, Control of Color Imaging Systems.

[47]  J. Weickert,et al.  Level-Set Methods for Tensor-Valued Images , 2003 .

[48]  Ronald Fedkiw,et al.  Level set methods and dynamic implicit surfaces , 2002, Applied mathematical sciences.

[49]  Jiří Matas,et al.  Computer Vision - ECCV 2004 , 2004, Lecture Notes in Computer Science.

[50]  Xavier Pennec,et al.  A Riemannian Framework for Tensor Computing , 2005, International Journal of Computer Vision.

[51]  Rachid Deriche,et al.  A Riemannian Approach to Diffusion Tensor Images Segmentation , 2005, IPMI.

[52]  D. Louis Collins,et al.  Design and construction of a realistic digital brain phantom , 1998, IEEE Transactions on Medical Imaging.

[53]  Jerry L. Prince,et al.  An Adaptive Fuzzy Segmentation Algorithm for Three-Dimensional Magnetic Resonance Images , 1999, IPMI.

[54]  Brian B. Avants,et al.  High-Dimensional Spatial Normalization of Diffusion Tensor Images Improves the Detection of White Matter Differences: An Example Study Using Amyotrophic Lateral Sclerosis , 2007, IEEE Transactions on Medical Imaging.

[55]  S.,et al.  CONSISTENT CROSS-VALIDATED DENSITY ESTIMATION , 2022 .

[56]  Robert P. W. Duin,et al.  On the Choice of Smoothing Parameters for Parzen Estimators of Probability Density Functions , 1976, IEEE Transactions on Computers.

[57]  P. Thomas Fletcher,et al.  Principal Geodesic Analysis on Symmetric Spaces: Statistics of Diffusion Tensors , 2004, ECCV Workshops CVAMIA and MMBIA.

[58]  Hayit Greenspan,et al.  Constrained Gaussian mixture model framework for automatic segmentation of MR brain images , 2006, IEEE Transactions on Medical Imaging.