Multistate survival models for partially censored data

In the analysis of survival data wit& parametric models, i t is well known that the Weibull model is not suitable for modeling where the hazard rate ie non-monotonic. For moh c a m , loglogistic model is frequently used. However, due to the symmetric property of the log-logistic model, i t may be po

## SUM MARY Consideration is given to survival data analysis by modelling the hazard as a discrete function of time. This is done for each individual who is examined independently from the other individuals of the sample observed. Assuming time has been divided into intervals of the same length, t

Neural networks are considered by many to be very promising tools for classification and prediction. The flexibility of the neural network models often result in over-fit. Shrinking the parameters using a penalized likelihood is often used in order to overcome such over-fit. In this paper we extend

A method is described for weak parametric modelling of arbitrarily interval censored survival data using generalized linear models. The method makes use of an associated Bernoulli model, with standard errors based on the observed information matrix. Three types of models are discussed additive and m

This paper shows how to fit excess and relative risk regression models to interval censored survival data, and how to implement the models in standard statistical software. The methods developed are used for the analysis of HIV infection rates in a cohort of Danish homosexual men. ## 1. Introductio