Hierarchical Geodesic Polynomial Model for Multilevel Analysis of Longitudinal Shape.

Ye Han, Jared Vicory, Guido Gerig, Patricia Sabin, Hannah Dewey, Silvani Amin, Ana Sulentic, Christian Hertz, Matthew Jolley, Beatriz Paniagua, James Fishbaugh
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Abstract

Longitudinal analysis is a core aspect of many medical applications for understanding the relationship between an anatomical subject's function and its trajectory of shape change over time. Whereas mixed-effects (or hierarchical) modeling is the statistical method of choice for analysis of longitudinal data, we here propose its extension as hierarchical geodesic polynomial model (HGPM) for multilevel analyses of longitudinal shape data. 3D shapes are transformed to a non-Euclidean shape space for regression analysis using geodesics on a high dimensional Riemannian manifold. At the subject-wise level, each individual trajectory of shape change is represented by a univariate geodesic polynomial model on timestamps. At the population level, multivariate polynomial expansion is applied to uni/multivariate geodesic polynomial models for both anchor points and tangent vectors. As such, the trajectory of an individual subject's shape changes over time can be modeled accurately with a reduced number of parameters, and population-level effects from multiple covariates on trajectories can be well captured. The implemented HGPM is validated on synthetic examples of points on a unit 3D sphere. Further tests on clinical 4D right ventricular data show that HGPM is capable of capturing observable effects on shapes attributed to changes in covariates, which are consistent with qualitative clinical evaluations. HGPM demonstrates its effectiveness in modeling shape changes at both subject-wise and population levels, which is promising for future studies of the relationship between shape changes over time and the level of dysfunction severity on anatomical objects associated with disease.

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纵向形状多层次分析的分层测地线多项式模型。
纵向分析是许多医学应用的核心方面,用于理解解剖主体的功能与其随时间变化的形状轨迹之间的关系。鉴于混合效应(或分层)建模是纵向数据分析的统计方法选择,我们在这里提出其扩展为分层测地线多项式模型(HGPM)用于纵向形状数据的多层次分析。利用高维黎曼流形上的测地线,将三维形状转换为非欧几里德形状空间进行回归分析。在主体层面,形状变化的每个个体轨迹由时间戳上的单变量测地线多项式模型表示。在总体水平上,多元多项式展开应用于锚点和切向量的单/多元测地线多项式模型。因此,个体受试者的形状随时间变化的轨迹可以用更少的参数精确地建模,并且可以很好地捕获多个协变量对轨迹的总体水平影响。在单位三维球面上的点的综合算例上验证了所实现的HGPM。对临床4D右心室数据的进一步测试表明,HGPM能够捕捉到归因于协变量变化的可观察到的对形状的影响,这与定性临床评估一致。HGPM证明了其在受试者和人群水平上建模形状变化的有效性,这为未来研究形状随时间变化与与疾病相关的解剖对象的功能障碍严重程度之间的关系提供了希望。
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