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Bi-invariant Two-Sample Tests in Lie Groups for Shape Analysis (2020)

Hanik, Martin ; Hege, Hans-Christian ; von Tycowicz, Christoph

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Publication Date: 2022-07-19

Description: We propose generalizations of the T²-statistics of Hotelling and the Bhattacharayya distance for data taking values in Lie groups. A key feature of the derived measures is that they are compatible with the group structure even for manifolds that do not admit any bi-invariant metric. This property, e.g., assures analysis that does not depend on the reference shape, thus, preventing bias due to arbitrary choices thereof. Furthermore, the generalizations agree with the common definitions for the special case of flat vector spaces guaranteeing consistency. Employing a permutation test setup, we further obtain nonparametric, two-sample testing procedures that themselves are bi-invariant and consistent. We validate our method in group tests revealing significant differences in hippocampal shape between individuals with mild cognitive impairment and normal controls.

Language: English

Type: conferenceobject , doc-type:conferenceObject

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Geodesic B-Score for Improved Assessment of Knee Osteoarthritis (2021)

Ambellan, Felix ; Zachow, Stefan (Dr.) ; von Tycowicz, Christoph (Dr.)

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Publication Date: 2022-07-19

Description: Three-dimensional medical imaging enables detailed understanding of osteoarthritis structural status. However, there remains a vast need for automatic, thus, reader-independent measures that provide reliable assessment of subject-specific clinical outcomes. To this end, we derive a consistent generalization of the recently proposed B-score to Riemannian shape spaces. We further present an algorithmic treatment yielding simple, yet efficient computations allowing for analysis of large shape populations with several thousand samples. Our intrinsic formulation exhibits improved discrimination ability over its Euclidean counterpart, which we demonstrate for predictive validity on assessing risks of total knee replacement. This result highlights the potential of the geodesic B-score to enable improved personalized assessment and stratification for interventions.

Language: English

Type: conferenceobject , doc-type:conferenceObject

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3

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Geodesic B-Score for Improved Assessment of Knee Osteoarthritis (2021)

Ambellan, Felix ; Zachow, Stefan (Dr.) ; von Tycowicz, Christoph (Dr.)

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Publication Date: 2022-07-19

Description: Three-dimensional medical imaging enables detailed understanding of osteoarthritis structural status. However, there remains a vast need for automatic, thus, reader-independent measures that provide reliable assessment of subject-specific clinical outcomes. To this end, we derive a consistent generalization of the recently proposed B-score to Riemannian shape spaces. We further present an algorithmic treatment yielding simple, yet efficient computations allowing for analysis of large shape populations with several thousand samples. Our intrinsic formulation exhibits improved discrimination ability over its Euclidean counterpart, which we demonstrate for predictive validity on assessing risks of total knee replacement. This result highlights the potential of the geodesic B-score to enable improved personalized assessment and stratification for interventions.

Language: English

Type: reportzib , doc-type:preprint

Format: application/pdf

Format: application/zip

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Nonlinear Regression on Manifolds for Shape Analysis using Intrinsic Bézier Splines (2020)

Hanik, Martin ; Hege, Hans-Christian ; Hennemuth, Anja (Prof. Dr.-Ing.) ; [et al.]

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Publication Date: 2022-07-19

Description: Intrinsic and parametric regression models are of high interest for the statistical analysis of manifold-valued data such as images and shapes. The standard linear ansatz has been generalized to geodesic regression on manifolds making it possible to analyze dependencies of random variables that spread along generalized straight lines. Nevertheless, in some scenarios, the evolution of the data cannot be modeled adequately by a geodesic. We present a framework for nonlinear regression on manifolds by considering Riemannian splines, whose segments are Bézier curves, as trajectories. Unlike variational formulations that require time-discretization, we take a constructive approach that provides efficient and exact evaluation by virtue of the generalized de Casteljau algorithm. We validate our method in experiments on the reconstruction of periodic motion of the mitral valve as well as the analysis of femoral shape changes during the course of osteoarthritis, endorsing Bézier spline regression as an effective and flexible tool for manifold-valued regression.

Language: English

Type: conferenceobject , doc-type:conferenceObject

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Geodesic Analysis in Kendall's Shape Space with Epidemiological Applications (2020)

Nava-Yazdani, Esfandiar ; Hege, Hans-Christian ; Sullivan, T. J. ; [et al.]

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Publication Date: 2022-07-19

Description: We analytically determine Jacobi fields and parallel transports and compute geodesic regression in Kendall’s shape space. Using the derived expressions, we can fully leverage the geometry via Riemannian optimization and thereby reduce the computational expense by several orders of magnitude over common, nonlinear constrained approaches. The methodology is demonstrated by performing a longitudinal statistical analysis of epidemiological shape data. As an example application we have chosen 3D shapes of knee bones, reconstructed from image data of the Osteoarthritis Initiative (OAI). Comparing subject groups with incident and developing osteoarthritis versus normal controls, we find clear differences in the temporal development of femur shapes. This paves the way for early prediction of incident knee osteoarthritis, using geometry data alone.

Language: English

Type: article , doc-type:article

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Rigid Motion Invariant Statistical Shape Modeling based on Discrete Fundamental Forms (2021)

Ambellan, Felix ; Zachow, Stefan (Dr.-Ing.) ; von Tycowicz, Christoph (Dr.)

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Publication Date: 2022-07-19

Description: We present a novel approach for nonlinear statistical shape modeling that is invariant under Euclidean motion and thus alignment-free. By analyzing metric distortion and curvature of shapes as elements of Lie groups in a consistent Riemannian setting, we construct a framework that reliably handles large deformations. Due to the explicit character of Lie group operations, our non-Euclidean method is very efficient allowing for fast and numerically robust processing. This facilitates Riemannian analysis of large shape populations accessible through longitudinal and multi-site imaging studies providing increased statistical power. Additionally, as planar configurations form a submanifold in shape space, our representation allows for effective estimation of quasi-isometric surfaces flattenings. We evaluate the performance of our model w.r.t. shape-based classification of hippocampus and femur malformations due to Alzheimer's disease and osteoarthritis, respectively. In particular, we achieve state-of-the-art accuracies outperforming the standard Euclidean as well as a recent nonlinear approach especially in presence of sparse training data. To provide insight into the model's ability of capturing biological shape variability, we carry out an analysis of specificity and generalization ability.

Language: English

Type: article , doc-type:article

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Morphomatics: Geometric morphometrics in non-Euclidean shape spaces (2021)

Ambellan, Felix ; Hanik, Martin ; von Tycowicz, Christoph

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Publication Date: 2022-07-19

Description: Morphomatics is an open-source Python library for (statistical) shape analysis developed within the geometric data analysis and processing research group at Zuse Institute Berlin. It contains prototype implementations of intrinsic manifold-based methods that are highly consistent and avoid the influence of unwanted effects such as bias due to arbitrary choices of coordinates.

Language: English

Type: software , doc-type:Other

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