We provide exact formulas about the survival copula of an exchangeable random vector of residual lifetimes when some of the components have failed. Specific computations are carried out in the case of Archimedean copulas and the evolution of dependence after successive failures of some components is shown numerically via measures of association. © 2014 Elsevier Inc. All rights reserved
In this note we consider a vector (X1,X2) of lifetimes whose dependence is described by an Archimede...
Consider (X,Y) describing the failure times of two non-indep. components of a system. Assuming that ...
AbstractThe dependence structure among each risk factors has been an important topic for researches ...
We provide exact formulas about the survival copula of an exchangeable random vector of residual lif...
We investigate the dependence properties of a vector of residual lifetimes by means of the copula as...
In this paper, the residual probability function is applied to analyze the survival probability of t...
We investigate the dependence properties of a vector of residual lifetimes by means of the copula as...
We consider non-negative conditionally independent and identically distributed random variables and ...
This paper proposes a general framework to compare the strength of the dependence in survival models...
For a couple of lifetimes (X-1, X-2) with an exchangeable joint survival function F, attention is fo...
AbstractFor a couple of lifetimes (X1,X2) with an exchangeable joint survival function F̄, attention...
In this paper, we review the use of copulas for multivariate survival modelling. In particular, we s...
On univariate and bivariate aging for dependent lifetimes with Archimedean survival copula
We consider a pair of exchangeable lifetimes X; Y and the families of the conditional survival funct...
We consider a pair of exchangeable lifetimes X, Y and the families of the conditional survival funct...
In this note we consider a vector (X1,X2) of lifetimes whose dependence is described by an Archimede...
Consider (X,Y) describing the failure times of two non-indep. components of a system. Assuming that ...
AbstractThe dependence structure among each risk factors has been an important topic for researches ...
We provide exact formulas about the survival copula of an exchangeable random vector of residual lif...
We investigate the dependence properties of a vector of residual lifetimes by means of the copula as...
In this paper, the residual probability function is applied to analyze the survival probability of t...
We investigate the dependence properties of a vector of residual lifetimes by means of the copula as...
We consider non-negative conditionally independent and identically distributed random variables and ...
This paper proposes a general framework to compare the strength of the dependence in survival models...
For a couple of lifetimes (X-1, X-2) with an exchangeable joint survival function F, attention is fo...
AbstractFor a couple of lifetimes (X1,X2) with an exchangeable joint survival function F̄, attention...
In this paper, we review the use of copulas for multivariate survival modelling. In particular, we s...
On univariate and bivariate aging for dependent lifetimes with Archimedean survival copula
We consider a pair of exchangeable lifetimes X; Y and the families of the conditional survival funct...
We consider a pair of exchangeable lifetimes X, Y and the families of the conditional survival funct...
In this note we consider a vector (X1,X2) of lifetimes whose dependence is described by an Archimede...
Consider (X,Y) describing the failure times of two non-indep. components of a system. Assuming that ...
AbstractThe dependence structure among each risk factors has been an important topic for researches ...