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Fast covariance estimation for multivariate sparse functional data

Cai Li, Luo Xiao, Sheng Luo

2020Stat50 citationsDOIOpen Access PDF

Abstract

Covariance estimation is essential yet underdeveloped for analyzing multivariate functional data. We propose a fast covariance estimation method for multivariate sparse functional data using bivariate penalized splines. The tensor-product B-spline formulation of the proposed method enables a simple spectral decomposition of the associated covariance operator and explicit expressions of the resulting eigenfunctions as linear combinations of B-spline bases, thereby dramatically facilitating subsequent principal component analysis. We derive a fast algorithm for selecting the smoothing parameters in covariance smoothing using leave-one-subject-out cross-validation. The method is evaluated with extensive numerical studies and applied to an Alzheimer's disease study with multiple longitudinal outcomes.

Topics & Concepts

CovarianceSmoothingFunctional principal component analysisMultivariate statisticsMathematicsEstimation of covariance matricesUnivariateSmoothing splinePrincipal component analysisFunctional data analysisSpline (mechanical)Covariance functionCovariance operatorBivariate analysisComputer scienceAlgorithmApplied mathematicsStatisticsSpline interpolationStructural engineeringBilinear interpolationEngineeringStatistical Methods and InferenceStatistical Methods and Bayesian InferenceBayesian Methods and Mixture Models
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