Bivariate aging notions for a vector X of lifetimes based on stochastic comparisons between X and X_t , where X_t is the multivariate residual lifetime after time t > 0, have been studied in Pellerey (2008) under the assumption that the dependence structure in X is described by an Archimedean survival copula. Similar stochastic comparisons between X_t and X_t+s , for all t s > 0, were considered in Mulero and Pellerey (2010). In this article, these results are generalized and extended to the multivariate case. Two illustrative examples are also provided
The frailty approach is commonly used in reliability theory and survival analysis to model the depen...
AbstractA class of generalized bivariate Marshall–Olkin distributions, which includes as special cas...
Ford >= 2, let X = (X(1),...,X(d)) be a vector of exchangeable continuous lifetimes with joint survi...
summary:Let $\mbox{\boldmath$X$} = (X,Y)$ be a pair of exchangeable lifetimes whose dependence struc...
AbstractFor a couple of lifetimes (X1,X2) with an exchangeable joint survival function F̄, attention...
In this note we consider a vector (X1,X2) of lifetimes whose dependence is described by an Archimede...
For a couple of lifetimes (X1,X2) with an exchangeable joint survival function , attention is focuse...
Consider (X,Y) describing the failure times of two non-indep. components of a system. Assuming that ...
We first review an approach that had been developed in the past years to introduce concepts of "biva...
For d≥2, let X=(X1, …, Xd) be a vector of exchangeable continuous lifetimes with joint survival func...
In this work we present a recent definition of Multivariate Increasing Failure Rate (MIFR) based on ...
summary:This paper proposes a general framework to compare the strength of the dependence in surviva...
Positive ageing denotes the adverse effect of age on random life times (survival or failure times) o...
AbstractThe properties of IFR (increasing failure rate) and PF2 (Polya frequency of order 2) are of ...
Different sufficient conditions for stochastic comparisons between random vectors have been describe...
The frailty approach is commonly used in reliability theory and survival analysis to model the depen...
AbstractA class of generalized bivariate Marshall–Olkin distributions, which includes as special cas...
Ford >= 2, let X = (X(1),...,X(d)) be a vector of exchangeable continuous lifetimes with joint survi...
summary:Let $\mbox{\boldmath$X$} = (X,Y)$ be a pair of exchangeable lifetimes whose dependence struc...
AbstractFor a couple of lifetimes (X1,X2) with an exchangeable joint survival function F̄, attention...
In this note we consider a vector (X1,X2) of lifetimes whose dependence is described by an Archimede...
For a couple of lifetimes (X1,X2) with an exchangeable joint survival function , attention is focuse...
Consider (X,Y) describing the failure times of two non-indep. components of a system. Assuming that ...
We first review an approach that had been developed in the past years to introduce concepts of "biva...
For d≥2, let X=(X1, …, Xd) be a vector of exchangeable continuous lifetimes with joint survival func...
In this work we present a recent definition of Multivariate Increasing Failure Rate (MIFR) based on ...
summary:This paper proposes a general framework to compare the strength of the dependence in surviva...
Positive ageing denotes the adverse effect of age on random life times (survival or failure times) o...
AbstractThe properties of IFR (increasing failure rate) and PF2 (Polya frequency of order 2) are of ...
Different sufficient conditions for stochastic comparisons between random vectors have been describe...
The frailty approach is commonly used in reliability theory and survival analysis to model the depen...
AbstractA class of generalized bivariate Marshall–Olkin distributions, which includes as special cas...
Ford >= 2, let X = (X(1),...,X(d)) be a vector of exchangeable continuous lifetimes with joint survi...