We propose a new class of semiparametric frailty models for spatially correlated survival data. Specifically, we extend the ordinary frailty models by allowing random effects accommodating spatial correlations to enter into the baseline hazard function multiplicatively. We prove identifiability of the models and give sufficient regularity conditions. We propose drawing inference based on a marginal rank likelihood. No parametric forms of the baseline hazard need to be assumed in this semiparametric approach. Monte Carlo simulations and the Laplace approach are used to tackle the intractable integral in the likelihood function. Different spatial covariance structures are explored in simulations and the proposed methods are applied to the Eas...
The frailty model is a random effect survival model, which allows for unobserved heterogeneity or fo...
Based on the example of data on breast cancer survival in a specific area in France, this paper desc...
In this thesis, we extend some flexible cure rate models, such as the geometric, negative binomial ...
Modeling spatially correlated data has gained increased attention in recent years, particularly due ...
[[abstract]]Spatially correlated survival data are frequently observed in ecological and epidemiolog...
The use of survival models involving a random effect or ‘frailty ’ term is becoming more common. Usu...
Most of the few published models used to obtain small-area estimates of relative survival are based ...
Most of the few published models used to obtain small-area estimates of relative survival are based ...
In this research we introduce a new class of Bayesian hierarchical models that incorporates spatial ...
Recent developments in GIS have encouraged health science databases to incorporate geographical info...
Survival data often contain small-area geographical or spatial information, such as the residence of...
There is an emerging interest in modeling spatially correlated survival data in biomedical and epide...
This thesis deals with frailty modelling, a framework devised to analyse clustered survival data. Th...
Frailty models are frequently used to analyse clustered survival data in medical contexts. The frail...
The hazard function plays a central role in survival analysis. In a homogeneous population, the dist...
The frailty model is a random effect survival model, which allows for unobserved heterogeneity or fo...
Based on the example of data on breast cancer survival in a specific area in France, this paper desc...
In this thesis, we extend some flexible cure rate models, such as the geometric, negative binomial ...
Modeling spatially correlated data has gained increased attention in recent years, particularly due ...
[[abstract]]Spatially correlated survival data are frequently observed in ecological and epidemiolog...
The use of survival models involving a random effect or ‘frailty ’ term is becoming more common. Usu...
Most of the few published models used to obtain small-area estimates of relative survival are based ...
Most of the few published models used to obtain small-area estimates of relative survival are based ...
In this research we introduce a new class of Bayesian hierarchical models that incorporates spatial ...
Recent developments in GIS have encouraged health science databases to incorporate geographical info...
Survival data often contain small-area geographical or spatial information, such as the residence of...
There is an emerging interest in modeling spatially correlated survival data in biomedical and epide...
This thesis deals with frailty modelling, a framework devised to analyse clustered survival data. Th...
Frailty models are frequently used to analyse clustered survival data in medical contexts. The frail...
The hazard function plays a central role in survival analysis. In a homogeneous population, the dist...
The frailty model is a random effect survival model, which allows for unobserved heterogeneity or fo...
Based on the example of data on breast cancer survival in a specific area in France, this paper desc...
In this thesis, we extend some flexible cure rate models, such as the geometric, negative binomial ...