A Bayesian multiple imputation approach to bivariate functional data with missing components

dc.contributor.authorJang, Jeong Hoon
dc.contributor.authorManatunga, Amita K.
dc.contributor.authorChang, Changgee
dc.contributor.authorLong, Qi
dc.contributor.departmentBiostatistics and Health Data Science, School of Medicineen_US
dc.date.accessioned2023-06-22T13:35:51Z
dc.date.available2023-06-22T13:35:51Z
dc.date.issued2021
dc.description.abstractExisting missing data methods for functional data mainly focus on reconstructing missing measurements along a single function-a univariate functional data setting. Motivated by a renal study, we focus on a bivariate functional data setting, where each sampling unit is a collection of two distinct component functions, one of which may be missing. Specifically, we propose a Bayesian multiple imputation approach based on a bivariate functional latent factor model that exploits the joint changing patterns of the component functions to allow accurate and stable imputation of one component given the other. We further extend the framework to address multilevel bivariate functional data with missing components by modeling and exploiting inter-component and intra-subject correlations. We develop a Gibbs sampling algorithm that simultaneously generates multiple imputations of missing component functions and posterior samples of model parameters. For multilevel bivariate functional data, a partially collapsed Gibbs sampler is implemented to improve computational efficiency. Our simulation study demonstrates that our methods outperform other competing methods for imputing missing components of bivariate functional data under various designs and missingness rates. The motivating renal study aims to investigate the distribution and pharmacokinetic properties of baseline and post-furosemide renogram curves that provide further insights into the underlying mechanism of renal obstruction, with post-furosemide renogram curves missing for some subjects. We apply the proposed methods to impute missing post-furosemide renogram curves and obtain more refined insights.en_US
dc.eprint.versionAuthor's manuscripten_US
dc.identifier.citationJang JH, Manatunga AK, Chang C, Long Q. A Bayesian multiple imputation approach to bivariate functional data with missing components. Stat Med. 2021;40(22):4772-4793. doi:10.1002/sim.9093en_US
dc.identifier.urihttps://hdl.handle.net/1805/33934
dc.language.isoen_USen_US
dc.publisherWileyen_US
dc.relation.isversionof10.1002/sim.9093en_US
dc.relation.journalStatistics in Medicineen_US
dc.rightsPublisher Policyen_US
dc.sourcePMCen_US
dc.subjectBayesian latent factor modelen_US
dc.subjectBivariate functional dataen_US
dc.subjectCurvesen_US
dc.subjectMissing dataen_US
dc.subjectMultiple imputationen_US
dc.titleA Bayesian multiple imputation approach to bivariate functional data with missing componentsen_US
dc.typeArticleen_US
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