Add to ORKGAcyclic phase-type (PH) distributions have been a popular tool in survival analysis, thanks to their natural interpretation in terms of ageing towards its inevitable absorption. In this paper, we consider an extension to the bivariate setting for the modelling of joint lifetimes. In contrast to previous models in the literature that were based on a separate estimation of the marginal behavior and the dependence structure through a copula, we propose a new time-inhomogeneous version of a multivariate PH class (mIPH) that leads to a model for joint lifetimes without that separation. We study properties of mIPH class members and provide an adapted estimation procedure that allows for right-censoring and covariate information. We show that init...
Stochastic mortality, i.e. modelling death arrival via a jump process with stochastic intensity, is ...
The frailty models are used to model the possible associations between survival times. Another alter...
The combined survival status of the insured lives is a critical problem when pricing and reserving i...
In this paper we investigate the flexibility of matrix distributions for the modeling of mortality. ...
Abstract: In this paper, we are interested in the dependence between lifetimes based on a joint surv...
In this paper, we propose a bivariate distribution for the bivariate survival times based on Farlie-...
Ageing is a universal and ever-present biological phenomenon. Yet, describing the ageing mechanism i...
Abstract: The insurance industry recently experienced a high demand for life in-surance policies iss...
A flexible class of multivariate distributions for continuous lifetimes is proposed. The distributio...
Stochastic mortality, i.e. modelling death arrival via a jump process with stochastic intensity, is ...
The aim of this paper is to explore multivariate survival techniques for the analysis of bivariate r...
Most publications on modeling insurance contracts on two lives, assuming dependence of the two lifet...
In analytical studies of longitudinal and time-to-event data, measuring the relationship between lon...
summary:Let $\mbox{\boldmath$X$} = (X,Y)$ be a pair of exchangeable lifetimes whose dependence struc...
For a couple of lifetimes (X1,X2) with an exchangeable joint survival function , attention is focuse...
Stochastic mortality, i.e. modelling death arrival via a jump process with stochastic intensity, is ...
The frailty models are used to model the possible associations between survival times. Another alter...
The combined survival status of the insured lives is a critical problem when pricing and reserving i...
In this paper we investigate the flexibility of matrix distributions for the modeling of mortality. ...
Abstract: In this paper, we are interested in the dependence between lifetimes based on a joint surv...
In this paper, we propose a bivariate distribution for the bivariate survival times based on Farlie-...
Ageing is a universal and ever-present biological phenomenon. Yet, describing the ageing mechanism i...
Abstract: The insurance industry recently experienced a high demand for life in-surance policies iss...
A flexible class of multivariate distributions for continuous lifetimes is proposed. The distributio...
Stochastic mortality, i.e. modelling death arrival via a jump process with stochastic intensity, is ...
The aim of this paper is to explore multivariate survival techniques for the analysis of bivariate r...
Most publications on modeling insurance contracts on two lives, assuming dependence of the two lifet...
In analytical studies of longitudinal and time-to-event data, measuring the relationship between lon...
summary:Let $\mbox{\boldmath$X$} = (X,Y)$ be a pair of exchangeable lifetimes whose dependence struc...
For a couple of lifetimes (X1,X2) with an exchangeable joint survival function , attention is focuse...
Stochastic mortality, i.e. modelling death arrival via a jump process with stochastic intensity, is ...
The frailty models are used to model the possible associations between survival times. Another alter...
The combined survival status of the insured lives is a critical problem when pricing and reserving i...