Regression analysis of survival data with covariates subject to censoring

In this thesis, we concern about some issues in survival data with censored covariates. In the first part, we explore the conditional modeling of the semi-competing risks data, where individuals are likely to experience two types of events: non-terminal and terminal. It is often of interest in pr...

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Main Author: Yu, Tonghui
Other Authors: Xiang Liming
Format: Theses and Dissertations
Language:English
Published: 2018
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Online Access:https://hdl.handle.net/10356/89713
http://hdl.handle.net/10220/47144
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Institution: Nanyang Technological University
Language: English
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spelling sg-ntu-dr.10356-897132023-02-28T23:39:41Z Regression analysis of survival data with covariates subject to censoring Yu, Tonghui Xiang Liming School of Physical and Mathematical Sciences DRNTU::Science::Mathematics::Statistics In this thesis, we concern about some issues in survival data with censored covariates. In the first part, we explore the conditional modeling of the semi-competing risks data, where individuals are likely to experience two types of events: non-terminal and terminal. It is often of interest in practice to predict the terminal event based on the progression of the non-terminal event. It endeavors to aggregate the censored non-terminal event time with other risk factors for better modeling the terminal event time. We propose a new semiparametric model for the terminal event time based on proportional hazards regression conditioning on the non-terminal event time. The model allows for a covariate subject to dependent and independent censoring on the hazard of the terminal event. In the second part, we propose a quantile regression model for survival data with covariates subject to limits of detection. A novel multiple imputation approach based on quantile regression for the censored covariates is developed to estimate model parameters. The proposed method extends the existing work based on an AFT model to quantile regression. Thus it possesses more flexibility by relaxing stringent constraints on error distribution used in the AFT model and allowing the effects of covariates varying across different quantile levels of the survival distribution. We develop two-stage estimation procedures in both parts and establish theoretical properties of the proposed estimators. The finite sample performances are demonstrated via extensive simulation studies. Real data applications illustrate the effectiveness of the proposed methods. Doctor of Philosophy 2018-12-20T23:45:26Z 2019-12-06T17:31:47Z 2018-12-20T23:45:26Z 2019-12-06T17:31:47Z 2018 Thesis Yu, T. (2018). Regression analysis of survival data with covariates subject to censoring. Doctoral thesis, Nanyang Technological University, Singapore. https://hdl.handle.net/10356/89713 http://hdl.handle.net/10220/47144 10.32657/10220/47144 en 143 p. application/pdf
institution Nanyang Technological University
building NTU Library
continent Asia
country Singapore
Singapore
content_provider NTU Library
collection DR-NTU
language English
topic DRNTU::Science::Mathematics::Statistics
spellingShingle DRNTU::Science::Mathematics::Statistics
Yu, Tonghui
Regression analysis of survival data with covariates subject to censoring
description In this thesis, we concern about some issues in survival data with censored covariates. In the first part, we explore the conditional modeling of the semi-competing risks data, where individuals are likely to experience two types of events: non-terminal and terminal. It is often of interest in practice to predict the terminal event based on the progression of the non-terminal event. It endeavors to aggregate the censored non-terminal event time with other risk factors for better modeling the terminal event time. We propose a new semiparametric model for the terminal event time based on proportional hazards regression conditioning on the non-terminal event time. The model allows for a covariate subject to dependent and independent censoring on the hazard of the terminal event. In the second part, we propose a quantile regression model for survival data with covariates subject to limits of detection. A novel multiple imputation approach based on quantile regression for the censored covariates is developed to estimate model parameters. The proposed method extends the existing work based on an AFT model to quantile regression. Thus it possesses more flexibility by relaxing stringent constraints on error distribution used in the AFT model and allowing the effects of covariates varying across different quantile levels of the survival distribution. We develop two-stage estimation procedures in both parts and establish theoretical properties of the proposed estimators. The finite sample performances are demonstrated via extensive simulation studies. Real data applications illustrate the effectiveness of the proposed methods.
author2 Xiang Liming
author_facet Xiang Liming
Yu, Tonghui
format Theses and Dissertations
author Yu, Tonghui
author_sort Yu, Tonghui
title Regression analysis of survival data with covariates subject to censoring
title_short Regression analysis of survival data with covariates subject to censoring
title_full Regression analysis of survival data with covariates subject to censoring
title_fullStr Regression analysis of survival data with covariates subject to censoring
title_full_unstemmed Regression analysis of survival data with covariates subject to censoring
title_sort regression analysis of survival data with covariates subject to censoring
publishDate 2018
url https://hdl.handle.net/10356/89713
http://hdl.handle.net/10220/47144
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