Latent Deformation Models for Multivariate Functional Data and Time Warping Separability

TL;DR

This paper introduces a novel latent deformation model for multivariate functional data that captures mutual time warping and phase variation, enabling better interpretation and dimension reduction in complex datasets.

Contribution

The paper proposes a new model connecting mutual time warping to a latent deformation framework using a separability assumption, with estimators and convergence rates for practical implementation.

Findings

Model effectively captures phase variation in multivariate data

Estimation procedures show good convergence properties

Applications demonstrate improved data representation and analysis

Abstract

Multivariate functional data present theoretical and practical complications which are not found in univariate functional data. One of these is a situation where the component functions of multivariate functional data are positive and are subject to mutual time warping. That is, the component processes exhibit a common shape but are subject to systematic phase variation across their domains in addition to subject-specific time warping, where each subject has its own internal clock. This motivates a novel model for multivariate functional data that connects such mutual time warping to a latent deformation-based framework by exploiting a novel time warping separability assumption. This separability assumption allows for meaningful interpretation and dimension reduction. The resulting Latent Deformation Model is shown to be well suited to represent commonly encountered functional vector data. The proposed approach combines a random amplitude factor for each component with population based registration across the components of a multivariate functional data vector and includes a latent population function, which corresponds to a common underlying trajectory. We propose estimators for all components of the model, enabling implementation of the proposed data-based representation for multivariate functional data and downstream analyses such as Fr\'echet regression. Rates of convergence are established when curves are fully observed or observed with measurement error. The usefulness of the model, interpretations, and practical aspects are illustrated in simulations and with application to multivariate human growth curves and multivariate environmental pollution data.