Multivariate Intrinsic Local Polynomial Regression on Isometric   Riemannian Manifolds: Applications to Positive Definite Data

Ronaldo Garc\'ia Reyes; Ying Wang; Min Li; Marlis Ontiviero Ortega,; Deirel Paz-Linares; L\'idice Gal\'an Garc\'ia; Pedro Antonio Valdez Sosa

arXiv:2305.01789·stat.ME·May 4, 2023·1 cites

Multivariate Intrinsic Local Polynomial Regression on Isometric Riemannian Manifolds: Applications to Positive Definite Data

Ronaldo Garc\'ia Reyes, Ying Wang, Min Li, Marlis Ontiviero Ortega,, Deirel Paz-Linares, L\'idice Gal\'an Garc\'ia, Pedro Antonio Valdez Sosa

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TL;DR

This paper develops a new non-parametric Riemannian regression method for multivariate data on isometric manifolds, with applications to positive definite matrices, offering analytical formulas, statistical properties, and improved computational performance.

Contribution

It introduces ILPR-IRMs, a generalized multivariate Riemannian regression technique with analytical solutions for EPMs, and demonstrates its effectiveness on SPD manifolds with applications to visualization.

Findings

01

ILPR-IRMs provide faster computation than extrinsic methods.

02

The method achieves lower error in simulations on SPD manifolds.

03

Log-Cholesky metric offers a good balance of speed and accuracy.

Abstract

The paper introduces a novel non-parametric Riemannian regression method using Isometric Riemannian Manifolds (IRMs). The proposed technique, Intrinsic Local Polynomial Regression on IRMs (ILPR-IRMs), enables global data mapping between Riemannian manifolds while preserving underlying geometries. The ILPR method is generalized to handle multivariate covariates on any Riemannian manifold and isometry. Specifically, for manifolds equipped with Euclidean Pullback Metrics (EPMs), a closed analytical formula is derived for the multivariate ILPR (ILPR-EPM). Asymptotic statistical properties of the ILPR-EPM for the multivariate local linear case are established, including a formula for the asymptotic bias, establishing estimator consistency. The paper showcases possible applications of the method by focusing on a group of Riemannian metrics on the Symmetric Positive Definite (SPD) manifold,…

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ronald1129/multivariate-intrinsic-local-polynomial-regression-on-isometric-riemannian-manifolds
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Taxonomy

TopicsMorphological variations and asymmetry