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1

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Cubic spline approximation of a circle with maximal smoothness and accuracy (2017)

Apprich, Christian ; Dieterich, Annegret ; Höllig, Klaus ; [et al.]

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Publication Date: 2020-12-14

Description: We construct cubic spline approximations of a circle which are four times continuously differentiable and converge with order six.

Language: English

Type: article , doc-type:article

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2

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De Casteljau's Algotithm on Manifolds (2013)

Nava-Yazdani, Esfandiar ; Polthier, Konrad

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Publication Date: 2022-07-19

Description: This paper proposes a generalization of the ordinary de Casteljau algorithm to manifold-valued data including an important special case which uses the exponential map of a symmetric space or Riemannian manifold. We investigate some basic properties of the corresponding Bézier curves and present applications to curve design on polyhedra and implicit surfaces as well as motion of rigid body and positive definite matrices. Moreover, we apply our approach to construct canal and developable surfaces.

Language: English

Type: article , doc-type:article

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3

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A Shape Trajectories Approach to Longitudinal Statistical Analysis (2018)

Nava-Yazdani, Esfandiar ; Hege, Hans-Christian ; von Tycowicz, Christoph ; [et al.]

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Publication Date: 2022-07-19

Description: For Kendall’s shape space we determine analytically Jacobi fields and parallel transport, and compute geodesic regression. Using the derived expressions, we can fully leverage the geometry via Riemannian optimization and reduce the computational expense by several orders of magnitude. The methodology is demonstrated by performing a longitudinal statistical analysis of epidemiological shape data. As application example we have chosen 3D shapes of knee bones, reconstructed from image data of the Osteoarthritis Initiative. 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 only.

Language: English

Type: reportzib , doc-type:preprint

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4

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A Geodesic Mixed Effects Model in Kendall's Shape Space (2019)

Nava-Yazdani, Esfandiar ; Hege, Hans-Christian ; von Tycowicz, Christoph

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Publication Date: 2022-07-19

Description: In many applications, geodesic hierarchical models are adequate for the study of temporal observations. We employ such a model derived for manifold-valued data to Kendall's shape space. In particular, instead of the Sasaki metric, we adapt a functional-based metric, which increases the computational efficiency and does not require the implementation of the curvature tensor. We propose the corresponding variational time discretization of geodesics and apply the approach for the estimation of group trends and statistical testing of 3D shapes derived from an open access longitudinal imaging study on osteoarthritis.

Language: English

Type: conferenceobject , doc-type:conferenceObject

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5

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A Geodesic Mixed Effects Model in Kendall's Shape Space (2019)

Nava-Yazdani, Esfandiar ; Hege, Hans-Christian ; von Tycowicz, Christoph

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Publication Date: 2022-07-19

Description: In many applications, geodesic hierarchical models are adequate for the study of temporal observations. We employ such a model derived for manifold-valued data to Kendall's shape space. In particular, instead of the Sasaki metric, we adapt a functional-based metric, which increases the computational efficiency and does not require the implementation of the curvature tensor. We propose the corresponding variational time discretization of geodesics and apply the approach for the estimation of group trends and statistical testing of 3D shapes derived from an open access longitudinal imaging study on osteoarthritis.

Language: English

Type: reportzib , doc-type:preprint

Format: application/pdf

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6

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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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7

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A Hierarchical Geodesic Model for Longitudinal Analysis on Manifolds (2021)

Nava-Yazdani, Esfandiar ; Hege, Hans-Christian ; von Tycowicz, Christoph

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Publication Date: 2023-11-06

Description: In many applications, geodesic hierarchical models are adequate for the study of temporal observations. We employ such a model derived for manifold-valued data to Kendall's shape space. In particular, instead of the Sasaki metric, we adapt a functional-based metric, which increases the computational efficiency and does not require the implementation of the curvature tensor. We propose the corresponding variational time discretization of geodesics and employ the approach for longitudinal analysis of 2D rat skulls shapes as well as 3D shapes derived from an imaging study on osteoarthritis. Particularly, we perform hypothesis test and estimate the mean trends.

Language: English

Type: reportzib , doc-type:preprint

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8

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A Hierarchical Geodesic Model for Longitudinal Analysis on Manifolds (2022)

Nava-Yazdani, Esfandiar ; Hege, Hans-Christian ; von Tycowicz, Christoph

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Publication Date: 2023-11-06

Description: In many applications, geodesic hierarchical models are adequate for the study of temporal observations. We employ such a model derived for manifold-valued data to Kendall's shape space. In particular, instead of the Sasaki metric, we adapt a functional-based metric, which increases the computational efficiency and does not require the implementation of the curvature tensor. We propose the corresponding variational time discretization of geodesics and employ the approach for longitudinal analysis of 2D rat skulls shapes as well as 3D shapes derived from an imaging study on osteoarthritis. Particularly, we perform hypothesis test and estimate the mean trends.

Language: English

Type: article , doc-type:article

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9

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On Gradient Formulas in an Algorithm for the Logarithm of the Sasaki Metric (2022)

Nava-Yazdani, Esfandiar ; Hanik, Martin ; Ambellan, Felix ; [et al.]

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Publication Date: 2023-11-06

Description: The Sasaki metric is the canonical metric on the tangent bundle TM of a Riemannian manifold M. It is highly useful for data analysis in TM (e.g., when one is interested in the statistics of a set of geodesics in M). To this end, computing the Riemannian logarithm is often necessary, and an iterative algorithm was proposed by Muralidharan and Fletcher. In this note, we derive approximation formulas of the energy gradients in their algorithm that we use with success.

Language: English

Type: reportzib , doc-type:preprint

Format: application/pdf

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