[[abstract]]This paper proposes a simple and exact method for conducting a statistical test about the shape parameter of the new two‐parameter lifetime distribution with a bathtub‐shaped or increasing failure rate function, as well as an exact confidence interval for the same parameter. The necessary critical values of the test are given. The method provided in this paper can be used for type II right censored data. Moreover, Monte Carlo simulation and an example are used to compare this new method to the existing approach of Chen (Statistics and Probability Letters 2000; 49:155–161).[[notice]]補正完畢[[journaltype]]國
The log-normal distribution is a useful lifetime distribution in many areas. The survival function o...
Reliability, Modified Weibull distribution, Parametric estimation, Non-parametric estimation, 62N02,...
Abstract: In this paper, we introduce a new three-parameter distribution by compounding the Nadaraja...
[[abstract]]This study considers the hypothesis test and interval estimation of the shape parameter ...
[[abstract]]This study considers the exact hypothesis test for the shape parameter of a new two-para...
[[abstract]]In this paper, we investigate the estimation problem concerning a progressively type-II ...
In this paper, we rst provide m pivotal quantities to test the shape parameter and establish condenc...
It is a common situation that the failure rate function has a bathtub shape for many mechanical and ...
Acquiring Bayesian prediction intervals for the first and final points of observation with the batht...
In this study, we introduce an extended version of the modified Weibull distribution with an additio...
Chen is suggested a two-parameter distribution. This distribution can have increasing failure rate f...
This paper deals with the estimation of reliability R = P[Y < X] when X and Y are two independent...
[[abstract]]We consider the problem of estimating unknown parameters, reliability function and hazar...
This paper raised a new four-parameter fitting model to describe bathtub curve, which is widely used...
[[abstract]]In this paper, we study the estimation problems for the two-parameter bathtub-shaped lif...
The log-normal distribution is a useful lifetime distribution in many areas. The survival function o...
Reliability, Modified Weibull distribution, Parametric estimation, Non-parametric estimation, 62N02,...
Abstract: In this paper, we introduce a new three-parameter distribution by compounding the Nadaraja...
[[abstract]]This study considers the hypothesis test and interval estimation of the shape parameter ...
[[abstract]]This study considers the exact hypothesis test for the shape parameter of a new two-para...
[[abstract]]In this paper, we investigate the estimation problem concerning a progressively type-II ...
In this paper, we rst provide m pivotal quantities to test the shape parameter and establish condenc...
It is a common situation that the failure rate function has a bathtub shape for many mechanical and ...
Acquiring Bayesian prediction intervals for the first and final points of observation with the batht...
In this study, we introduce an extended version of the modified Weibull distribution with an additio...
Chen is suggested a two-parameter distribution. This distribution can have increasing failure rate f...
This paper deals with the estimation of reliability R = P[Y < X] when X and Y are two independent...
[[abstract]]We consider the problem of estimating unknown parameters, reliability function and hazar...
This paper raised a new four-parameter fitting model to describe bathtub curve, which is widely used...
[[abstract]]In this paper, we study the estimation problems for the two-parameter bathtub-shaped lif...
The log-normal distribution is a useful lifetime distribution in many areas. The survival function o...
Reliability, Modified Weibull distribution, Parametric estimation, Non-parametric estimation, 62N02,...
Abstract: In this paper, we introduce a new three-parameter distribution by compounding the Nadaraja...