This paper introduces a novel approach to making inference about the regression parameters in the accelerated failure time (AFT) model for current status and interval censored data. The estimator is constructed by inverting a Wald type test for testing a null proportional hazards model. A numerically efficient Markov chain Monte Carlo (MCMC) based resampling method is proposed to simultaneously obtain the point estimator and a consistent estimator of its variance-covariance matrix. We illustrate our approach with interval censored data sets from two clinical studies. Extensive numerical studies are conducted to evaluate the finite sample performance of the new estimators
Estimating the covariance matrix of the rank estimators in the accelerated failure time model is com...
Right-censored data arise when the event time can only be observed up to the end of the follow-up, w...
Survival analysis is used in many fields for analysis of data, particularly in medical and biologi...
[ACCESS RESTRICTED TO THE UNIVERSITY OF MISSOURI AT AUTHOR'S REQUEST.] Interval-censored failure tim...
The entire dissertation/thesis text is included in the research.pdf file; the official abstract appe...
Interval-censored multivariate failure time data arise when there are multiple types of failure or t...
In clinical trials and cohort studies the event of interest is often not observable, and is known on...
[[abstract]]A voluminous literature on right-censored failure time data has been developed in the pa...
Theroretical thesis.Bibliography: pages 161-171.1. Introduction -- 2. Literature review -- 3. MPL ap...
By interval-censored failure time data, we mean that the failure time of interest is observed to bel...
Partly interval-censored (PIC) data arise when some failure times are exactly observed while others ...
Independent censoring is a crucial assumption in survival analysis. However, this is imprac-tical in...
In survival analysis, semiparametric accelerated failure time (AFT) models directly relate the predi...
The accelerated failure time (AFT) model is a useful alternative to the proportional hazard model fo...
Semiparametric analysis and rank-based inference for the accelerated failure time model are complica...
Estimating the covariance matrix of the rank estimators in the accelerated failure time model is com...
Right-censored data arise when the event time can only be observed up to the end of the follow-up, w...
Survival analysis is used in many fields for analysis of data, particularly in medical and biologi...
[ACCESS RESTRICTED TO THE UNIVERSITY OF MISSOURI AT AUTHOR'S REQUEST.] Interval-censored failure tim...
The entire dissertation/thesis text is included in the research.pdf file; the official abstract appe...
Interval-censored multivariate failure time data arise when there are multiple types of failure or t...
In clinical trials and cohort studies the event of interest is often not observable, and is known on...
[[abstract]]A voluminous literature on right-censored failure time data has been developed in the pa...
Theroretical thesis.Bibliography: pages 161-171.1. Introduction -- 2. Literature review -- 3. MPL ap...
By interval-censored failure time data, we mean that the failure time of interest is observed to bel...
Partly interval-censored (PIC) data arise when some failure times are exactly observed while others ...
Independent censoring is a crucial assumption in survival analysis. However, this is imprac-tical in...
In survival analysis, semiparametric accelerated failure time (AFT) models directly relate the predi...
The accelerated failure time (AFT) model is a useful alternative to the proportional hazard model fo...
Semiparametric analysis and rank-based inference for the accelerated failure time model are complica...
Estimating the covariance matrix of the rank estimators in the accelerated failure time model is com...
Right-censored data arise when the event time can only be observed up to the end of the follow-up, w...
Survival analysis is used in many fields for analysis of data, particularly in medical and biologi...