Confidence interval construction for the scale parameter of the half-logistic distribution is considered using four different methods. The first two are based on the asymptotic distribution of the maximum likelihood estimator (MLE) and log-transformed MLE. The last two are based on pivotal quantity and generalized pivotal quantity, respectively. The MLE for the scale parameter is obtained using the expectation-maximization (EM) algorithm. Performances are compared with the confidence intervals proposed by Balakrishnan and Asgharzadeh via coverage probabilities, length, and coverage-to-length ratio. Simulation results support the efficacy of the proposed approach
Confidence intervals for the median lethal dose (LD50) and other dose percentiles in logistic regres...
Traditional inferential procedures often fail with censored and truncated data, especially when samp...
[[abstract]]The interval estimation of the scale parameter and the joint confidence region of the pa...
In this article, we consider a k-unit series system with component lifetime distribution to be a mem...
The point and interval estimations for the unknown parameters of an exponentiated half-logistic dist...
In this paper, we consider partially step-stress ALT model when the lifetime of units under normal c...
A generalization of the Half Logistic Distribution is developed through exponentiation of its surviv...
In this paper, we derive maximum likelihood estimators (MLEs) and approximate maximum likelihood est...
In this paper, we derive the maximum likelihood estimator(MLE) and some approximate maximum like-lih...
[[abstract]]A conditional method of inference is used to derive confidence intervals for the locatio...
In this study, a new four parameter distribution called the Lehmann type II generalized half logisti...
In this paper we develop approximate Bayes estimators of the scale parameter of the logistic distrib...
This paper aims to adopt partially accelerated life tests model, under Type-II censoring scheme. The...
The process capability indices are important numerical measures in statistical quality control. Well...
A generalization of the half logistic distribution is developed through exponentiation of its cumula...
Confidence intervals for the median lethal dose (LD50) and other dose percentiles in logistic regres...
Traditional inferential procedures often fail with censored and truncated data, especially when samp...
[[abstract]]The interval estimation of the scale parameter and the joint confidence region of the pa...
In this article, we consider a k-unit series system with component lifetime distribution to be a mem...
The point and interval estimations for the unknown parameters of an exponentiated half-logistic dist...
In this paper, we consider partially step-stress ALT model when the lifetime of units under normal c...
A generalization of the Half Logistic Distribution is developed through exponentiation of its surviv...
In this paper, we derive maximum likelihood estimators (MLEs) and approximate maximum likelihood est...
In this paper, we derive the maximum likelihood estimator(MLE) and some approximate maximum like-lih...
[[abstract]]A conditional method of inference is used to derive confidence intervals for the locatio...
In this study, a new four parameter distribution called the Lehmann type II generalized half logisti...
In this paper we develop approximate Bayes estimators of the scale parameter of the logistic distrib...
This paper aims to adopt partially accelerated life tests model, under Type-II censoring scheme. The...
The process capability indices are important numerical measures in statistical quality control. Well...
A generalization of the half logistic distribution is developed through exponentiation of its cumula...
Confidence intervals for the median lethal dose (LD50) and other dose percentiles in logistic regres...
Traditional inferential procedures often fail with censored and truncated data, especially when samp...
[[abstract]]The interval estimation of the scale parameter and the joint confidence region of the pa...