A scalable Matérn Gaussian process for learning spatial curves distributions

A scalable Matérn Gaussian process for learning spatial curves distributions

Data points on Riemannian manifolds are fundamental objects in many applications and fields. Representations include shapes from biology and medical imaging, directions and rotations from robots. This paper addresses the problem of nonparametric regression on shapes when only few observations are av...

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Bibliographic Details
Published in:Information sciences Vol. 614; pp. 348 - 361
Main Authors: Tran, Tam Tien, Feunteun, Yan, Samir, Chafik, Braga, José
Format: Journal Article
Language:English
Published: Elsevier Inc 01-10-2022
Elsevier
Subjects:
Artificial Intelligence
Computer Science
Gaussian process prior
Learning on nonlinear manifolds
Maniflods
Regression and classification
Statistical shape analysis
Gaussian process prior
Statistical shape analysis
Maniflods
Learning on nonlinear manifolds
Regression and classification
Gaussian process prior Maniflods Statistical shape analysis Learning on nonlinear manifolds Regression and classification
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Summary:Data points on Riemannian manifolds are fundamental objects in many applications and fields. Representations include shapes from biology and medical imaging, directions and rotations from robots. This paper addresses the problem of nonparametric regression on shapes when only few observations are available. In particular, we consider the problem of classifying unobserved 3D open parametrized curves using a continuous stochastic process to overcome the discrete nature of observations. The proposed method has a practical objective, characterizing populations of cochlear curves. The numerical solution is geometrically simpler, extensible and can be generalized for other applications. We illustrate and discuss the successful behavior of the proposed approach with various and multiple experimental results.
ISSN:0020-0255
1872-6291
DOI:10.1016/j.ins.2022.10.003