Mixtures of increasing failure rate distributions (IFR) can decrease at least in some intervals of time. Usually this property is observed asymptotically as time tends to infinity , which is due to the fact that a mixture failure rate is 'bent down', as the weakest populations are dying out first. We consider a survival model, generalizing a very well known in reliability and survival analysis additive hazards, proportional hazards and accelerated life models. We obtain new explicit asymptotic relations for a general setting and study specific cases. Under reasonable assumptions we prove that asymptotic behavior of the mixture failure rate depends only on the behavior of the mixing distri-bution in the neighborhood of the left end point of ...
In this paper the failure rate of the Weibull-Weibull length-biased mixture distribution which is ch...
In this article, the failure rates of the system's components are functions of time t. We study...
A bivariate competing risks problem is considered for a rather general class of survival models. The...
Mixture os increasing failure rate distributions (IFR) can decrease at least in some intervals of ti...
Mixtures of increasing failure rate distributions (IFR) can decrease at least in some intervals of t...
Abstract: Mixtures of distributions are usually effectively used for modeling hetero-geneity. It is ...
Consider a family of distributions with survival distributions that are log concave and stochastical...
© Copyright is held by the authors. Working papers of the Max Planck Institute for Demographic Resea...
Censored survival data, immune proportion, covariates, mixture models, failure time data, exponentia...
Mixture of distributions, decreasing failure rate, increasing failure rate, proportional hazards mod...
It is quite plausible that any device or system reliability shows an increasing failure rate (IFR) a...
In this paper we review the role of finite mixture models in the field of survival analysis. Finite ...
The tail behavior or age-smoothness of a lifetime distribution is an important property from both th...
Two topics are presented in this dissertation: (1) obtaining bathtub-shaped failure rates from mixtu...
Life distributions, mixture, mean residual life, characterization, failure rate,
In this paper the failure rate of the Weibull-Weibull length-biased mixture distribution which is ch...
In this article, the failure rates of the system's components are functions of time t. We study...
A bivariate competing risks problem is considered for a rather general class of survival models. The...
Mixture os increasing failure rate distributions (IFR) can decrease at least in some intervals of ti...
Mixtures of increasing failure rate distributions (IFR) can decrease at least in some intervals of t...
Abstract: Mixtures of distributions are usually effectively used for modeling hetero-geneity. It is ...
Consider a family of distributions with survival distributions that are log concave and stochastical...
© Copyright is held by the authors. Working papers of the Max Planck Institute for Demographic Resea...
Censored survival data, immune proportion, covariates, mixture models, failure time data, exponentia...
Mixture of distributions, decreasing failure rate, increasing failure rate, proportional hazards mod...
It is quite plausible that any device or system reliability shows an increasing failure rate (IFR) a...
In this paper we review the role of finite mixture models in the field of survival analysis. Finite ...
The tail behavior or age-smoothness of a lifetime distribution is an important property from both th...
Two topics are presented in this dissertation: (1) obtaining bathtub-shaped failure rates from mixtu...
Life distributions, mixture, mean residual life, characterization, failure rate,
In this paper the failure rate of the Weibull-Weibull length-biased mixture distribution which is ch...
In this article, the failure rates of the system's components are functions of time t. We study...
A bivariate competing risks problem is considered for a rather general class of survival models. The...