This paper characterizes the general behaviors of the MRL (mean residual lives) for both continuous and discrete lifetime distributions, with respect to their failure rates. For the continuous lifetime distribution with failure rates with only one or two change-points, the characteristic of the MRL depends only on its mean and failure rate at time zero. For failure rates with "roller coaster" behavior, the subsequent behavior of the MRL depends on its MRL and failure-rates at the change points. Using the characterization, their behaviors for the: Weibull; lognormal; Birnbaum-Saunders; inverse Gaussian; and bathtub failure rate distributions are tabulated in terms of their shape parameters. For discrete lifetime distributions, for upside-dow...
summary:In this paper, we introduce a general family of continuous lifetime distributions by compoun...
There is a family of statistical models, whose failure rate is unimodal or reverse bathtub shaped. F...
Given that a unit is of age t, the remaining life after time t is ran-dom. The expected value of thi...
This paper characterizes the general behaviors of the MRL (mean residual lives) for both continuous ...
Mean residual life and failure rate functions are ubiquitously employed in reliability ana...
The purpose of this study was to correct some mistakes in the literature and derive a necessary and ...
The classes of life distributions which exhibit the trend change in its aging properties, such as fa...
The present work is in the area of Reliability Analysis. It is widely regarded that this is among th...
10.1016/j.ress.2003.12.005Reliability Engineering and System Safety843293-299RESS
Dynamic reliability measures are important characteristics for understanding the lifetime behaviour ...
In reliability theory and survival analysis, many set of data are generated by distributions with b...
In reliability theory and survival analysis, many set of data are generated by distributions with ba...
A new class of lifetime distributions, which can exhibit with upside-down bathtub-shaped, bathtub-sh...
The mean residual life (MRL) function is one of the most important, widely used reliability measures...
Simple models for the failure (mortality) rate change point are considered. The relationship with th...
summary:In this paper, we introduce a general family of continuous lifetime distributions by compoun...
There is a family of statistical models, whose failure rate is unimodal or reverse bathtub shaped. F...
Given that a unit is of age t, the remaining life after time t is ran-dom. The expected value of thi...
This paper characterizes the general behaviors of the MRL (mean residual lives) for both continuous ...
Mean residual life and failure rate functions are ubiquitously employed in reliability ana...
The purpose of this study was to correct some mistakes in the literature and derive a necessary and ...
The classes of life distributions which exhibit the trend change in its aging properties, such as fa...
The present work is in the area of Reliability Analysis. It is widely regarded that this is among th...
10.1016/j.ress.2003.12.005Reliability Engineering and System Safety843293-299RESS
Dynamic reliability measures are important characteristics for understanding the lifetime behaviour ...
In reliability theory and survival analysis, many set of data are generated by distributions with b...
In reliability theory and survival analysis, many set of data are generated by distributions with ba...
A new class of lifetime distributions, which can exhibit with upside-down bathtub-shaped, bathtub-sh...
The mean residual life (MRL) function is one of the most important, widely used reliability measures...
Simple models for the failure (mortality) rate change point are considered. The relationship with th...
summary:In this paper, we introduce a general family of continuous lifetime distributions by compoun...
There is a family of statistical models, whose failure rate is unimodal or reverse bathtub shaped. F...
Given that a unit is of age t, the remaining life after time t is ran-dom. The expected value of thi...