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DC FieldValueLanguage
dc.contributorDepartment of Applied Mathematicsen_US
dc.contributor.advisorZhao, Xingqiu (AMA)-
dc.contributor.advisorChen, Xiaojun (AMA)-
dc.creatorLiu, Kin Yat-
dc.identifier.urihttps://theses.lib.polyu.edu.hk/handle/200/10124-
dc.languageEnglishen_US
dc.publisherHong Kong Polytechnic University-
dc.rightsAll rights reserveden_US
dc.titleSemiparametric statistical inference for functional survival modelsen_US
dcterms.abstractThis thesis focuses on the development of semiparametric inference for the functional Cox proportional hazards model and the functional additive hazards model with right-censored data. We propose a penalized partial likelihood approach and a penalized pseudo-score function approach to the estimation of the model parameters of the functional Cox proportional hazards model and that of the functional additive hazards model, respectively. We establish asymptotic properties which include the consistency, the convergence rate, and the limiting distribution of the proposed estimators. To this end, we investigate the joint Bahadur representation of finite-dimensional and infinite-dimensional estimators in the Sobolev space with proper inner products. One major contribution made to the study of the functional Cox proportional hazards model and the functional additive hazards model is that the asymptotic joint normality of the estimators of the functional coefficient and the scalar coefficient is derived. Furthermore, the partial likelihood ratio test is developed and is shown to be optimal under the functional Cox proportional hazards model. These two important issues are not addressed in the previous research. Our new results provide more insights and deeper understanding about the effects of functional predictors on the hazard function. The theoretical results are validated by simulation studies, and the applications of the proposed models are illustrated with a real dataset. Some discussions and closing remarks are given.en_US
dcterms.extentxvi, 105 pages : color illustrationsen_US
dcterms.isPartOfPolyU Electronic Thesesen_US
dcterms.issued2019en_US
dcterms.educationalLevelPh.D.en_US
dcterms.educationalLevelAll Doctorateen_US
dcterms.LCSHHong Kong Polytechnic University -- Dissertationsen_US
dcterms.LCSHEstimation theory -- Mathematical modelsen_US
dcterms.LCSHProportional hazards modelsen_US
dcterms.LCSHStatisticsen_US
dcterms.accessRightsopen accessen_US

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Please use this identifier to cite or link to this item: https://theses.lib.polyu.edu.hk/handle/200/10124