Correlated survival data naturally arise from many clinical and epidemiological studies. For the analysis of such data, the Gamma-frailty proportional hazards (PH) model is a popular choice because the regression parameters have marginal interpretations and the statistical association between the failure times can be explicitly quantified via Kendall’s tau. Despite their popularity, Gamma-frailty PH models for correlated interval-censored data have not received as much attention as analogous models for right-censored data. A Gamma-frailty PH model for bivariate interval-censored data is presented and an easy to implement expectation–maximization (EM) algorithm for model fitting is developed. The proposed model adopts a monotone spline repre...
The shared frailty models allow for unobserved heterogeneity or for statistical dependence between o...
Interval censoring is frequently encountered in many clinical trials with periodic follow tip as the...
This paper discovers an inherent relationship between the survival model with covariate measurement ...
Survival analysis is a long-lasting and popular research area and has numerous applications in all f...
The proportional hazards model (PH) is currently the most popular regression model for analyzing tim...
[[abstract]]Owing to the fact that general semiparametric inference procedures are still underdevelo...
peer-reviewedWe develop flexible multiparameter regression (MPR) survival models for interval‐censor...
Interval-censored time-to-event data arise frequently in clinical trials and longitudinal studies, w...
Background: Multivariate analysis of interval censored event data based on classical likelihood meth...
Proportional hazards model is commonly used in survival analysis for estimating the effects of diffe...
peer reviewedThe shared frailty model is a popular tool to analyze correlated right-censored time-to...
Frequently in the analysis of survival data, survival times within the same group are correlated due...
We fit a Cox proportional hazards (PH) model to interval-censored survival data by first subdividing...
Both censored survival data and panel count data arise commonly in real-life studies in many fields ...
The Weibull multi-parameter regression (MPR) model with frailty is developed for interval censored s...
The shared frailty models allow for unobserved heterogeneity or for statistical dependence between o...
Interval censoring is frequently encountered in many clinical trials with periodic follow tip as the...
This paper discovers an inherent relationship between the survival model with covariate measurement ...
Survival analysis is a long-lasting and popular research area and has numerous applications in all f...
The proportional hazards model (PH) is currently the most popular regression model for analyzing tim...
[[abstract]]Owing to the fact that general semiparametric inference procedures are still underdevelo...
peer-reviewedWe develop flexible multiparameter regression (MPR) survival models for interval‐censor...
Interval-censored time-to-event data arise frequently in clinical trials and longitudinal studies, w...
Background: Multivariate analysis of interval censored event data based on classical likelihood meth...
Proportional hazards model is commonly used in survival analysis for estimating the effects of diffe...
peer reviewedThe shared frailty model is a popular tool to analyze correlated right-censored time-to...
Frequently in the analysis of survival data, survival times within the same group are correlated due...
We fit a Cox proportional hazards (PH) model to interval-censored survival data by first subdividing...
Both censored survival data and panel count data arise commonly in real-life studies in many fields ...
The Weibull multi-parameter regression (MPR) model with frailty is developed for interval censored s...
The shared frailty models allow for unobserved heterogeneity or for statistical dependence between o...
Interval censoring is frequently encountered in many clinical trials with periodic follow tip as the...
This paper discovers an inherent relationship between the survival model with covariate measurement ...