The aim of the present study is to obtain and compare confidence intervals for the variance of a Gaussian distribution. Considering respectively the square error and the Higgins-Tsokos loss functions, approximate Bayesian confidence intervals for the variance of a normal population are derived. Using normal data and SAS software, the obtained approximate Bayesian confidence intervals will then be compared to the ones obtained with the well known classical method. The Bayesian approach relies only on the observations. It is shown that the proposed approximate Bayesian approach relies only on the observations. The classical method, that uses the Chi-square statistic, does not always yield the best confidence intervals
Herein, we propose the Bayesian approach for constructing the confidence intervals for both the coef...
Krishnamoorthy, Mathewand Ramachandran (2006) developed a method to draw inference on the mean and v...
In this paper, an approximate asymptotic confidence interval for the population standard deviation (...
This study obtained and compared confidence intervals for the mean of a Gaussian distribution. Consi...
Confidence intervals are constructed for the coefficient of variation of a Gaussian distribution. Co...
Rules of decision-making about the variance of a Gaussian distribution are obtained and compared. Co...
The aim of this article is to obtain and compare confidence intervals for the mean of an exponential...
“The purpose of this thesis is to briefly review various properties which may be desirable for a sys...
The coefficient of variation (CV) is a helpful quantity to describe the variation in evaluating resu...
Frequentist confidence intervals were compared with Bayesian credible intervals under a variety of s...
This paper proposes confidence intervals for a single mean and difference of two means of normal dis...
[1] Confidence intervals based on classical regression theories augmented to include prior informati...
A variety of methods for constructing approximate confidence intervals for particular functions of v...
<p>The well-known Wilson and Agresti–Coull confidence intervals for a binomial proportion <i>p</i> a...
The coefficient of variation (CV), defined as the ratio of the standard deviation to the mean, is of...
Herein, we propose the Bayesian approach for constructing the confidence intervals for both the coef...
Krishnamoorthy, Mathewand Ramachandran (2006) developed a method to draw inference on the mean and v...
In this paper, an approximate asymptotic confidence interval for the population standard deviation (...
This study obtained and compared confidence intervals for the mean of a Gaussian distribution. Consi...
Confidence intervals are constructed for the coefficient of variation of a Gaussian distribution. Co...
Rules of decision-making about the variance of a Gaussian distribution are obtained and compared. Co...
The aim of this article is to obtain and compare confidence intervals for the mean of an exponential...
“The purpose of this thesis is to briefly review various properties which may be desirable for a sys...
The coefficient of variation (CV) is a helpful quantity to describe the variation in evaluating resu...
Frequentist confidence intervals were compared with Bayesian credible intervals under a variety of s...
This paper proposes confidence intervals for a single mean and difference of two means of normal dis...
[1] Confidence intervals based on classical regression theories augmented to include prior informati...
A variety of methods for constructing approximate confidence intervals for particular functions of v...
<p>The well-known Wilson and Agresti–Coull confidence intervals for a binomial proportion <i>p</i> a...
The coefficient of variation (CV), defined as the ratio of the standard deviation to the mean, is of...
Herein, we propose the Bayesian approach for constructing the confidence intervals for both the coef...
Krishnamoorthy, Mathewand Ramachandran (2006) developed a method to draw inference on the mean and v...
In this paper, an approximate asymptotic confidence interval for the population standard deviation (...